Knapsack problem/Unbounded
You are encouraged to solve this task according to the task description, using any language you may know.
See also: Knapsack problem/Bounded, Knapsack problem/0-1
A traveller gets diverted and has to make an unscheduled stop in what turns out to be Shangri La. Opting to leave, he is allowed to take as much as he likes of the following items, so long as it will fit in his knapsack, and he can carry it. He knows that he can carry no more than 25 'weights' in total; and that the capacity of his knapsack is 0.25 'cubic lengths'.
Looking just above the bar codes on the items he finds their weights and volumes. He digs out his recent copy of a financial paper and gets the value of each item.
Item | Explanation | Value (each) | weight | Volume (each) |
panacea (vials of) | Incredible healing properties | 3000 | 0.3 | 0.025 |
ichor (ampules of) | Vampires blood | 1800 | 0.2 | 0.015 |
gold (bars) | Shiney shiney | 2500 | 2.0 | 0.002 |
Knapsack | For the carrying of | - | <=25 | <=0.25 |
He can only take whole units of any item, but there is much more of any item than he could ever carry
How many of each item does he take to maximise the value of items he is carrying away with him?
Note:
- There are four solutions that maximise the value taken. Only one need be given.
Ada
<lang Ada>with Ada.Text_IO;
procedure Knapsack_Unbounded is
type Bounty is record Value : Natural; Weight : Float; Volume : Float; end record;
function Min (A, B : Float) return Float is begin if A < B then return A; else return B; end if; end Min;
Panacea : Bounty := (3000, 0.3, 0.025); Ichor : Bounty := (1800, 0.2, 0.015); Gold : Bounty := (2500, 2.0, 0.002); Limits : Bounty := ( 0, 25.0, 0.250); Best : Bounty := ( 0, 0.0, 0.000); Current : Bounty := ( 0, 0.0, 0.000);
Best_Amounts : array (1 .. 3) of Natural := (0, 0, 0);
Max_Panacea : Natural := Natural (Float'Floor (Min (Limits.Weight / Panacea.Weight, Limits.Volume / Panacea.Volume))); Max_Ichor : Natural := Natural (Float'Floor (Min (Limits.Weight / Ichor.Weight, Limits.Volume / Ichor.Volume))); Max_Gold : Natural := Natural (Float'Floor (Min (Limits.Weight / Gold.Weight, Limits.Volume / Gold.Volume)));
begin
for Panacea_Count in 0 .. Max_Panacea loop for Ichor_Count in 0 .. Max_Ichor loop for Gold_Count in 0 .. Max_Gold loop Current.Value := Panacea_Count * Panacea.Value + Ichor_Count * Ichor.Value + Gold_Count * Gold.Value; Current.Weight := Float (Panacea_Count) * Panacea.Weight + Float (Ichor_Count) * Ichor.Weight + Float (Gold_Count) * Gold.Weight; Current.Volume := Float (Panacea_Count) * Panacea.Volume + Float (Ichor_Count) * Ichor.Volume + Float (Gold_Count) * Gold.Volume; if Current.Value > Best.Value and Current.Weight <= Limits.Weight and Current.Volume <= Limits.Volume then Best := Current; Best_Amounts := (Panacea_Count, Ichor_Count, Gold_Count); end if; end loop; end loop; end loop; Ada.Text_IO.Put_Line ("Maximum value:" & Natural'Image (Best.Value)); Ada.Text_IO.Put_Line ("Panacea:" & Natural'Image (Best_Amounts (1))); Ada.Text_IO.Put_Line ("Ichor: " & Natural'Image (Best_Amounts (2))); Ada.Text_IO.Put_Line ("Gold: " & Natural'Image (Best_Amounts (3)));
end Knapsack_Unbounded;</lang>
ALGOL 68
<lang algol68>MODE BOUNTY = STRUCT(STRING name, INT value, weight, volume);
[]BOUNTY items = (
("panacea", 3000, 3, 25), ("ichor", 1800, 2, 15), ("gold", 2500, 20, 2) );
BOUNTY sack := ("sack", 0, 250, 250);
OP * = ([]INT a,b)INT: ( # dot product operator #
INT sum := 0; FOR i TO UPB a DO sum +:= a[i]*b[i] OD; sum
);
OP INIT = (REF[]INT vector)VOID:
FOR index FROM LWB vector TO UPB vector DO vector[index]:=0 OD;
OP INIT = (REF[,]INT matrix)VOID:
FOR row index FROM LWB matrix TO UPB matrix DO INIT matrix[row index,] OD;
PROC total value = ([]INT items count, []BOUNTY items, BOUNTY sack) STRUCT(INT value, weight, volume):(
### Given the count of each item in the sack return -1 if they can"t be carried or their total value.
(also return the negative of the weight and the volume so taking the max of a series of return values will minimise the weight if values tie, and minimise the volume if values and weights tie). ### INT weight = items count * weight OF items; INT volume = items count * volume OF items; IF weight > weight OF sack OR volume > volume OF sack THEN (-1, 0, 0) ELSE ( items count * value OF items, -weight, -volume) FI
);
PRIO WRAP = 5; # wrap negative array indices as per python's indexing regime # OP WRAP = (INT index, upb)INT:
IF index>=0 THEN index ELSE upb + index + 1 FI;
PROC knapsack dp = ([]BOUNTY items, BOUNTY sack)[]INT:(
### Solves the Knapsack problem, with two sets of weights, using a dynamic programming approach ###
# (weight+1) x (volume+1) table # # table[w,v] is the maximum value that can be achieved # # with a sack of weight w and volume v. # # They all start out as 0 (empty sack) # [0:weight OF sack, 0:volume OF sack]INT table; INIT table;
FOR w TO 1 UPB table DO FOR v TO 2 UPB table DO ### Consider the optimal solution, and consider the "last item" added to the sack. Removing this item must produce an optimal solution to the subproblem with the sack"s weight and volume reduced by that of the item. So we search through all possible "last items": ### FOR item index TO UPB items DO BOUNTY item := items[item index]; # Only consider items that would fit: # IF w >= weight OF item AND v >= volume OF item THEN # Optimal solution to subproblem + value of item: # INT candidate := table[w-weight OF item,v-volume OF item] + value OF item; IF candidate > table[w,v] THEN table[w,v] := candidate FI FI OD OD OD;
[UPB items]INT result; INIT result; INT w := weight OF sack, v := volume OF sack; WHILE table[w,v] /= 0 DO # Find the last item that was added: # INT needle = table[w,v]; INT item index; FOR i TO UPB items WHILE item index := i; BOUNTY item = items[item index]; INT candidate = table[w-weight OF item WRAP UPB table, v-volume OF item WRAP 2 UPB table] + value OF item;
- WHILE # candidate NE needle DO
SKIP OD; # Record it in the result, and remove it: # result[item index] +:= 1; w -:= weight OF items[item index]; v -:= volume OF items[item index] OD; result
);
[]INT max items = knapsack dp(items, sack); STRUCT (INT value, weight, volume) max := total value(max items, items, sack); max := (value OF max, -weight OF max, -volume OF max);
FORMAT d = $zz-d$;
printf(($"The maximum value achievable (by dynamic programming) is "gl$, value OF max)); printf(($" The number of ("n(UPB items-1)(g", ")g") items to achieve this is: ("n(UPB items-1)(f(d)",")f(d)") respectively"l$,
name OF items, max items));
printf(($" The weight to carry is "f(d)", and the volume used is "f(d)l$,
weight OF max, volume OF max))</lang>Output:
The maximum value achievable (by dynamic programming) is +54500 The number of (panacea, ichor, gold) items to achieve this is: ( 9, 0, 11) respectively The weight to carry is 247, and the volume used is 247
AutoHotkey
Brute Force. <lang AutoHotkey>Item = Panacea,Ichor,Gold Value = 3000,1800,2500 Weight= 3,2,20 ; *10 Volume= 25,15,2 ; *1000
StringSplit I, Item, `, ; Put input in arrays StringSplit W, Weight,`, StringSplit $, Value, `, StringSplit V, Volume,`,
SetFormat Float, 0.3 W := 250, V := 250, sW:=.1, sV:=.001 ; limits for the total, scale factors p := -1, Wp := -W1, Vp := -V1 ; initial values While (Wp+=W1) <= W && (Vp+=V1) <= V {
p++, Wi := Wp-W2, Vi := Vp-V2, i := -1 While (Wi+=W2) <= W && (Vi+=V2) <= V { i++, Wg := Wi-W3, Vg := Vi-V3, g := -1 While (Wg+=W3) <= W && (Vg+=V3) <= V If ($ <= Val := p*$1 + i*$2 + ++g*$3) t := ($=Val ? t "`n " : " ") . p "`t " i "`t " g "`t " Wg*sW "`t " Vg*sV , $ := Val }
} MsgBox Value = %$%`n`nPanacea`tIchor`tGold`tWeight`tVolume`n%t%</lang>
C
<lang c>#include <stdio.h>
double min(double a, double b) {
return a < b ? a : b;
}
struct Bounty {
int value; double weight, volume;
};
struct Bounty panacea = {3000, 0.3, 0.025},
ichor = {1800, 0.2, 0.015}, gold = {2500, 2.0, 0.002}, sack = { 0, 25.0, 0.25 }, current, best;
- define CALC(V) current.V = npanacea * panacea.V + nichor * ichor.V + ngold * gold.V
int main(void) {
int npanacea, nichor, ngold, max_panacea, max_ichor, max_gold; int best_amounts[3]; best.value = 0; max_panacea = (int)min(sack.weight / panacea.weight, sack.volume / panacea.volume); max_ichor = (int)min(sack.weight / ichor.weight, sack.volume / ichor.volume); max_gold = (int)min(sack.weight / gold.weight, sack.volume / gold.volume);
for (npanacea = 0; npanacea <= max_panacea; npanacea++) { for (nichor = 0; nichor <= max_ichor; nichor++) { for (ngold = 0; ngold <= max_gold; ngold++) { CALC(value); CALC(weight); CALC(volume); if (current.value > best.value && current.weight <= sack.weight && current.volume <= sack.volume) { best.value = current.value; best.weight = current.weight; best.volume = current.volume; best_amounts[0] = npanacea; best_amounts[1] = nichor; best_amounts[2] = ngold; } } } } printf("Maximum value achievable is %d\n", best.value); printf("This is achieved by carrying (one solution) %d panacea, %d ichor and %d gold\n", best_amounts[0], best_amounts[1], best_amounts[2]); printf("The weight to carry is %4.1f and the volume used is %5.3f\n", best.weight, best.volume);
return 0;
}</lang>
Clojure
<lang lisp>(defstruct item :value :weight :volume)
(defn total [key items quantities]
(reduce + (map * quantities (map key items))))
(defn max-count [item max-weight max-volume]
(let [mcw (/ max-weight (:weight item)) mcv (/ max-volume (:volume item))] (min mcw mcv)))</lang>
We have an item struct to contain the data for both contents and the knapsack. The total function returns the sum of a particular attribute across all items times their quantities. Finally, the max-count function returns the most of that item that could fit given the constraints (used as the upper bound on the combination). Now the real work: <lang lisp>(defn knapsacks []
(let [pan (struct item 3000 0.3 0.025) ich (struct item 1800 0.2 0.015) gol (struct item 2500 2.0 0.002) types [pan ich gol] max-w 25.0 max-v 0.25 iters #(range (inc (max-count % max-w max-v)))] (filter (complement nil?) (pmap #(let [[p i g] % w (total :weight types %) v (total :volume types %)] (if (and (<= w max-w) (<= v max-v)) (with-meta (struct item (total :value types %) w v) {:p p :i i :g g}))) (for [p (iters pan) i (iters ich) g (iters gol)] [p i g])))))</lang>
The knapsacks function returns a lazy sequence of all valid knapsacks, with the particular content quantities as metadata. The work of realizing each knapsack is done in parallel via the pmap function. The following then finds the best by value, and prints the result. <lang lisp>(defn best-by-value [ks]
(reduce #(if (> (:value %1) (:value %2)) %1 %2) ks))
(defn print-knapsack[k]
(let [ {val :value w :weight v :volume} k {p :p i :i g :g} ^k] (println "Maximum value:" (float val)) (println "Total weight: " (float w)) (println "Total volume: " (float v)) (println "Containing: " p "Panacea," i "Ichor," g "Gold")))</lang>
Calling (print-knapsack (best-by-value (knapsacks))) would result in something like:
Maximum value: 54500 Total weight: 24.7 Total volume: 0.247 Containing: 9 Panacea, 0 Ichor, 11 Gold
Further, we could find all "best" knapsacks rather simply (albeit at the cost of some efficiency): <lang lisp>(defn all-best-by-value [ks]
(let [b (best-by-value ks)] (filter #(= (:value b) (:value %)) ks)))
(defn print-knapsacks [ks]
(doseq [k ks] (print-knapsack k) (println)))</lang>
Calling (print-knapsacks (all-best-by-value (knapsacks))) would result in something like:
Maximum value: 54500.0 Total weight: 25.0 Total volume: 0.247 Containing: 0 Panacea, 15 Ichor, 11 Gold Maximum value: 54500.0 Total weight: 24.9 Total volume: 0.247 Containing: 3 Panacea, 10 Ichor, 11 Gold Maximum value: 54500.0 Total weight: 24.8 Total volume: 0.247 Containing: 6 Panacea, 5 Ichor, 11 Gold Maximum value: 54500.0 Total weight: 24.7 Total volume: 0.247 Containing: 9 Panacea, 0 Ichor, 11 Gold
Common Lisp
A dynamic programming O(maxVolume × maxWeight × nItems) solution, where volumes and weights are integral values.
<lang lisp>(defun fill-knapsack (items max-volume max-weight)
"Items is a list of lists of the form (name value weight volume) where weight
and value are integers. max-volume and max-weight, also integers, are the maximum volume and weight of the knapsack. fill-knapsack returns a list of the form (total-value inventory total-volume total-weight) where total-value is the total-value of a knapsack packed with inventory (a list whose elements are elements of items), and total-weight and total-volume are the total weights and volumes of the inventory."
;; maxes is a table indexed by volume and weight, where maxes[volume,weight] ;; is a list of the form (value inventory used-volume used-weight) where ;; inventory is a list of items of maximum value fitting within volume and ;; weight, value is the maximum value, and used-volume/used-weight are the ;; actual volume/weight of the inventory. (let* ((VV (1+ max-volume)) (WW (1+ max-weight)) (maxes (make-array (list VV WW)))) ;; fill in the base cases where volume or weight is 0 (dotimes (v VV) (setf (aref maxes v 0) (list 0 '() 0 0))) (dotimes (w WW) (setf (aref maxes 0 w) (list 0 '() 0 0))) ;; populate the rest of the table. The best value for a volume/weight ;; combination is the best way of adding an item to any of the inventories ;; from [volume-1,weight], [volume,weight-1], or [volume-1,weight-1], or the ;; best of these, if no items can be added. (do ((v 1 (1+ v))) ((= v VV) (aref maxes max-volume max-weight)) (do ((w 1 (1+ w))) ((= w WW)) (let ((options (sort (list (aref maxes v (1- w)) (aref maxes (1- v) w) (aref maxes (1- v) (1- w))) '> :key 'first))) (destructuring-bind (b-value b-items b-volume b-weight) (first options) (dolist (option options) (destructuring-bind (o-value o-items o-volume o-weight) option (dolist (item items) (destructuring-bind (_ i-value i-volume i-weight) item (declare (ignore _)) (when (and (<= (+ o-volume i-volume) v) (<= (+ o-weight i-weight) w) (> (+ o-value i-value) b-value)) (setf b-value (+ o-value i-value) b-volume (+ o-volume i-volume) b-weight (+ o-weight i-weight) b-items (list* item o-items))))))) (setf (aref maxes v w) (list b-value b-items b-volume b-weight))))))))</lang>
Use, having multiplied volumes and weights as to be integral:
> (pprint (fill-knapsack '((panacea 3000 3 25) (ichor 1800 2 15) (gold 2500 20 2)) 250 250)) (54500 ; total-value ((ICHOR 1800 2 15) ; 15 ichor ... (ICHOR 1800 2 15) (GOLD 2500 20 2) ; 11 gold ... (GOLD 2500 20 2)) 250 ; total volume 247) ; total weight
E
This is a mostly brute-force general solution (the first author of this example does not know dynamic programming); the only optimization is that when considering the last (third) treasure type, it does not bother filling with anything but the maximum amount.
<lang e>pragma.enable("accumulator")
/** A data type representing a bunch of stuff (or empty space). */ def makeQuantity(value, weight, volume, counts) {
def quantity { to __printOn(out) { for name => n in counts { out.print(`$n $name `) } out.print(`(val=$value wt=$weight vol=$volume)`) } to value () { return value } to weight() { return weight } to volume() { return volume } to counts() { return counts } to subtract(other) { return quantity + other * -1 } to add(other) { return makeQuantity(value + other.value (), weight + other.weight(), volume + other.volume(), accum counts for name => n in other.counts() { _.with(name, n+counts.fetch(name, fn {0})) }) } to multiply(scalar) { return makeQuantity(value * scalar, weight * scalar, volume * scalar, accum [].asMap() for name => n in counts { _.with(name, n*scalar) }) } /** a.fit(b) the greatest integer k such that a - b * k does not have negative weight or volume. */ to fit(item) { return (weight // item.weight()) \ .min(volume // item.volume()) } } return quantity
}
/** Fill the space with the treasures, returning candidate results as spaceAvailable - the items. */ def fill(spaceAvailable, treasures) {
if (treasures.size().isZero()) { # nothing to pick return [spaceAvailable] } # Pick one treasure type def [unit] + otherTreasures := treasures var results := [] for count in (0..spaceAvailable.fit(unit)).descending() { results += fill(spaceAvailable - unit * count, otherTreasures) if (otherTreasures.size().isZero()) { break # If there are no further kinds, there is no point in taking less than the most } } return results
}
def chooseBest(emptyKnapsack, treasures) {
var maxValue := 0 var best := [] for result in fill(emptyKnapsack, treasures) { def taken := emptyKnapsack - result # invert the backwards result fill() returns if (taken.value() > maxValue) { best := [taken] maxValue := taken.value() } else if (taken.value() <=> maxValue) { best with= taken } } return best
}
def printBest(emptyKnapsack, treasures) {
for taken in chooseBest(emptyKnapsack, treasures) { println(` $taken`) }
}
def panacea := makeQuantity(3000, 0.3, 0.025, ["panacea" => 1]) def ichor := makeQuantity(1800, 0.2, 0.015, ["ichor" => 1]) def gold := makeQuantity(2500, 2.0, 0.002, ["gold" => 1]) def emptyKnapsack \
:= makeQuantity( 0, 25, 0.250, [].asMap())
printBest(emptyKnapsack, [panacea, ichor, gold])</lang>
Factor
This is a brute force solution. It is general enough to be able to provide solutions for any number of different items. <lang factor>USING: accessors combinators kernel locals math math.order math.vectors sequences sequences.product combinators.short-circuit ; IN: knapsack
CONSTANT: values { 3000 1800 2500 } CONSTANT: weights { 0.3 0.2 2.0 } CONSTANT: volumes { 0.025 0.015 0.002 }
CONSTANT: max-weight 25.0 CONSTANT: max-volume 0.25
TUPLE: bounty amounts value weight volume ;
- <bounty> ( items -- bounty )
[ bounty new ] dip { [ >>amounts ] [ values v. >>value ] [ weights v. >>weight ] [ volumes v. >>volume ] } cleave ;
- valid-bounty? ( bounty -- ? )
{ [ weight>> max-weight <= ] [ volume>> max-volume <= ] } 1&& ;
M:: bounty <=> ( a b -- <=> )
a valid-bounty? [ b valid-bounty? [ a b [ value>> ] compare ] [ +gt+ ] if ] [ b valid-bounty? +lt+ +eq+ ? ] if ;
- find-max-amounts ( -- amounts )
weights volumes [ [ max-weight swap / ] [ max-volume swap / ] bi* min >integer ] 2map ;
- best-bounty ( -- bounty )
find-max-amounts [ 1 + iota ] map <product-sequence> [ <bounty> ] [ max ] map-reduce ;</lang>
Forth
<lang forth>\ : value ; immediate
- weight cell+ ;
- volume 2 cells + ;
- number 3 cells + ;
\ item value weight volume number create panacea 30 , 3 , 25 , 0 , create ichor 18 , 2 , 15 , 0 , create gold 25 , 20 , 2 , 0 , create sack 0 , 250 , 250 ,
- fits? ( item -- ? )
dup weight @ sack weight @ > if drop false exit then volume @ sack volume @ > 0= ;
- add ( item -- )
dup @ sack +! dup weight @ negate sack weight +! dup volume @ negate sack volume +! 1 swap number +! ;
- take ( item -- )
dup @ negate sack +! dup weight @ sack weight +! dup volume @ sack volume +! -1 swap number +! ;
variable max-value variable max-pan variable max-ich variable max-au
- .solution
cr max-pan @ . ." Panaceas, " max-ich @ . ." Ichors, and " max-au @ . ." Gold for a total value of " max-value @ 100 * . ;
- check
sack @ max-value @ <= if exit then sack @ max-value ! panacea number @ max-pan ! ichor number @ max-ich ! gold number @ max-au ! ( .solution ) ; \ and change <= to < to see all solutions
- solve-gold
gold fits? if gold add recurse gold take else check then ;
- solve-ichor
ichor fits? if ichor add recurse ichor take then solve-gold ;
- solve-panacea
panacea fits? if panacea add recurse panacea take then solve-ichor ;
solve-panacea .solution</lang> Or like this... <lang forth>0 VALUE vials 0 VALUE ampules 0 VALUE bars 0 VALUE bag
- 250 3 / #250 #25 / MIN 1+ CONSTANT maxvials
- 250 2/ #250 #15 / MIN 1+ CONSTANT maxampules
- 250 #20 / #250 2/ MIN 1+ CONSTANT maxbars
- RESULTS ( v a b -- k )
3DUP #20 * SWAP 2* + SWAP 3 * + #250 > IF 3DROP -1 EXIT ENDIF 3DUP 2* SWAP #15 * + SWAP #25 * + #250 > IF 3DROP -1 EXIT ENDIF #2500 * SWAP #1800 * + SWAP #3000 * + ;
- .SOLUTION ( -- )
CR ." The traveller's knapsack contains " vials DEC. ." vials of panacea, " ampules DEC. ." ampules of ichor, " CR bars DEC. ." bars of gold, a total value of " vials ampules bars RESULTS 0DEC.R ." ." ;
- KNAPSACK ( -- )
-1 TO bag maxvials 0 ?DO maxampules 0 ?DO maxbars 0 ?DO
K J I RESULTS DUP
bag > IF TO bag K TO vials J TO ampules I TO bars ELSE DROP ENDIF LOOP LOOP LOOP .SOLUTION ;</lang> With the result...
FORTH> knapsack The traveller's knapsack contains 0 vials of panacea, 15 ampules of ichor, 11 bars of gold, a total value of 54500. ok
Fortran
A straight forward 'brute force' approach <lang fortran>PROGRAM KNAPSACK
IMPLICIT NONE REAL :: totalWeight, totalVolume INTEGER :: maxPanacea, maxIchor, maxGold, maxValue = 0 INTEGER :: i, j, k INTEGER :: n(3)
TYPE Bounty INTEGER :: value REAL :: weight REAL :: volume END TYPE Bounty
TYPE(Bounty) :: panacea, ichor, gold, sack, current
panacea = Bounty(3000, 0.3, 0.025) ichor = Bounty(1800, 0.2, 0.015) gold = Bounty(2500, 2.0, 0.002) sack = Bounty(0, 25.0, 0.25)
maxPanacea = MIN(sack%weight / panacea%weight, sack%volume / panacea%volume) maxIchor = MIN(sack%weight / ichor%weight, sack%volume / ichor%volume) maxGold = MIN(sack%weight / gold%weight, sack%volume / gold%volume) DO i = 0, maxPanacea DO j = 0, maxIchor Do k = 0, maxGold current%value = k * gold%value + j * ichor%value + i * panacea%value current%weight = k * gold%weight + j * ichor%weight + i * panacea%weight current%volume = k * gold%volume + j * ichor%volume + i * panacea%volume IF (current%weight > sack%weight .OR. current%volume > sack%volume) CYCLE IF (current%value > maxValue) THEN maxValue = current%value totalWeight = current%weight totalVolume = current%volume n(1) = i ; n(2) = j ; n(3) = k END IF END DO END DO END DO
WRITE(*, "(A,I0)") "Maximum value achievable is ", maxValue WRITE(*, "(3(A,I0),A)") "This is achieved by carrying ", n(1), " panacea, ", n(2), " ichor and ", n(3), " gold items" WRITE(*, "(A,F4.1,A,F5.3)") "The weight to carry is ", totalWeight, " and the volume used is ", totalVolume
END PROGRAM KNAPSACK</lang> Sample output
Maximum value achievable is 54500 This is achieved by carrying 0 panacea, 15 ichor and 11 gold items The weight to carry is 25.0 and the volume used is 0.247
Go
Recursive brute-force. <lang go>package main
import "fmt"
type Item struct {
Name string Value int Weight, Volume float64
}
type Result struct {
Counts []int Sum int
}
func min(a, b int) int {
if a < b { return a } return b
}
func Knapsack(items []Item, index int, weight, volume float64) (best *Result) {
if index == len(items) { return &Result{make([]int, len(items)), 0} } itemValue := items[index].Value itemWeight := items[index].Weight itemVolume := items[index].Volume maxCount := min(int(weight/itemWeight), int(volume/itemVolume)) for count := 0; count <= maxCount; count++ { sol := Knapsack(items, index+1, weight-float64(count)*itemWeight, volume-float64(count)*itemVolume) if sol != nil { sol.Counts[index] = count sol.Sum += itemValue * count if best == nil || sol.Sum > best.Sum { best = sol } } } return
}
func main() {
items := []Item{ Item{"Panacea", 3000, 0.3, 0.025}, Item{"Ichor", 1800, 0.2, 0.015}, Item{"Gold", 2500, 2.0, 0.002}, } var sumCount, sumValue int var sumWeight, sumVolume float64
result := Knapsack(items, 0, 25, 0.25)
for i := range result.Counts { fmt.Printf("%-8s x%3d -> Weight: %4.1f Volume: %5.3f Value: %6d\n", items[i].Name, result.Counts[i], items[i].Weight*float64(result.Counts[i]), items[i].Volume*float64(result.Counts[i]), items[i].Value*result.Counts[i])
sumCount += result.Counts[i] sumValue += items[i].Value * result.Counts[i] sumWeight += items[i].Weight * float64(result.Counts[i]) sumVolume += items[i].Volume * float64(result.Counts[i]) }
fmt.Printf("TOTAL (%3d items) Weight: %4.1f Volume: %5.3f Value: %6d\n", sumCount, sumWeight, sumVolume, sumValue)
}</lang>
Output:
Panacea x 0 -> Weight: 0.0 Volume: 0.000 Value: 0 Ichor x 15 -> Weight: 3.0 Volume: 0.225 Value: 27000 Gold x 11 -> Weight: 22.0 Volume: 0.022 Value: 27500 TOTAL ( 26 items) Weight: 25.0 Volume: 0.247 Value: 54500
Haskell
This is a brute-force solution: it generates a list of every legal combination of items (options) and then finds the option of greatest value.
<lang haskell>import Data.List (maximumBy) import Data.Ord (comparing)
(maxWgt, maxVol) = (25, 0.25) items =
[Bounty "panacea" 3000 0.3 0.025, Bounty "ichor" 1800 0.2 0.015, Bounty "gold" 2500 2.0 0.002]
data Bounty = Bounty
{itemName :: String, itemVal :: Int, itemWgt, itemVol :: Double}
names = map itemName items vals = map itemVal items wgts = map itemWgt items vols = map itemVol items
dotProduct :: (Num a, Integral b) => [a] -> [b] -> a dotProduct factors = sum . zipWith (*) factors . map fromIntegral
options :: Int options = filter fits $ mapM f items
where f (Bounty _ _ w v) = [0 .. m] where m = floor $ min (maxWgt / w) (maxVol / v) fits opt = dotProduct wgts opt <= maxWgt && dotProduct vols opt <= maxVol
showOpt :: [Int] -> String showOpt opt = concat (zipWith showItem names opt) ++
"total weight: " ++ show (dotProduct wgts opt) ++ "\ntotal volume: " ++ show (dotProduct vols opt) ++ "\ntotal value: " ++ show (dotProduct vals opt) ++ "\n" where showItem name num = name ++ ": " ++ show num ++ "\n"
main = putStr $ showOpt $ best options
where best = maximumBy $ comparing $ dotProduct vals</lang>
Output:
panacea: 9 ichor: 0 gold: 11 total weight: 24.7 total volume: 0.247 total value: 54500
HicEst
<lang hicest>CHARACTER list*1000
NN = ALIAS($Panacea, $Ichor, $Gold, wSack, wPanacea, wIchor, wGold, vSack, vPanacea, vIchor, vGold) NN = (3000, 1800, 2500, 25, 0.3, 0.2, 2.0, 0.25, 0.025, 0.015, 0.002) maxItems = ALIAS(maxPanacea, maxIchor, maxGold) maxItems = ( MIN( wSack/wPanacea, vSack/vPanacea), MIN( wSack/wIchor, vSack/vIchor), MIN( wSack/wGold, vSack/vGold) )
maxValue = 0 DO Panaceas = 0, maxPanacea
DO Ichors = 0, maxIchor DO Golds = 0, maxGold weight = Panaceas*wPanacea + Ichors*wIchor + Golds*wGold IF( weight <= wSack ) THEN volume = Panaceas*vPanacea + Ichors*vIchor + Golds*vGold IF( volume <= vSack ) THEN value = Panaceas*$Panacea + Ichors*$Ichor + Golds*$Gold IF( value > maxValue ) THEN maxValue = value ! this restarts the list, removing all previous entries: WRITE(Text=list, Name) value, Panaceas, Ichors, Golds, weight, volume, $CR//$LF ELSEIF( value == maxValue ) THEN WRITE(Text=list, Name, APPend) value, Panaceas, Ichors, Golds, weight, volume, $CR//$LF ENDIF ENDIF ENDIF ENDDO ENDDO
ENDDO</lang> <lang hicest>value=54500; Panaceas=0; Ichors=15; Golds=11; weight=25; volume=0.247; value=54500; Panaceas=3; Ichors=10; Golds=11; weight=24.9; volume=0.247; value=54500; Panaceas=6; Ichors=5; Golds=11; weight=24.8; volume=0.247; value=54500; Panaceas=9; Ichors=0; Golds=11; weight=24.7; volume=0.247; </lang>
J
Brute force solution. <lang j>mwv=: 25 0.25 prods=: <;. _1 ' panacea: ichor: gold:' hdrs=: <;. _1 ' weight: volume: value:' vls=: 3000 1800 2500 ws=: 0.3 0.2 2.0 vs=: 0.025 0.015 0.002
ip=: +/ .* prtscr=: (1!:2)&2
KS=: 3 : 0
os=. (#:i.@(*/)) mwv >:@<.@<./@:% ws,:vs bo=.os#~(ws,:vs) mwv&(*./@:>)@ip"_ 1 os mo=.bo{~{.\: vls ip"1 bo prtscr &.> prods ([,' ',":@])&.>mo prtscr &.> hdrs ('total '&,@[,' ',":@])&.> mo ip"1 ws,vs,:vls LF
)</lang> Example output:
KS'' panacea: 3 ichor: 10 gold: 11 total weight: 24.9 total volume: 0.247 total value: 54500
Java
With recursion for more than 3 items. <lang java>package hu.pj.alg;
import hu.pj.obj.Item; import java.text.*;
public class UnboundedKnapsack {
protected Item [] items = { new Item("panacea", 3000, 0.3, 0.025), new Item("ichor" , 1800, 0.2, 0.015), new Item("gold" , 2500, 2.0, 0.002) }; protected final int n = items.length; // the number of items protected Item sack = new Item("sack" , 0, 25.0, 0.250); protected Item best = new Item("best" , 0, 0.0, 0.000); protected int [] maxIt = new int [n]; // maximum number of items protected int [] iIt = new int [n]; // current indexes of items protected int [] bestAm = new int [n]; // best amounts
public UnboundedKnapsack() { // initializing: for (int i = 0; i < n; i++) { maxIt [i] = Math.min( (int)(sack.getWeight() / items[i].getWeight()), (int)(sack.getVolume() / items[i].getVolume()) ); } // for (i)
// calc the solution: calcWithRecursion(0);
// Print out the solution: NumberFormat nf = NumberFormat.getInstance(); System.out.println("Maximum value achievable is: " + best.getValue()); System.out.print("This is achieved by carrying (one solution): "); for (int i = 0; i < n; i++) { System.out.print(bestAm[i] + " " + items[i].getName() + ", "); } System.out.println(); System.out.println("The weight to carry is: " + nf.format(best.getWeight()) + " and the volume used is: " + nf.format(best.getVolume()) );
}
// calculation the solution with recursion method // item : the number of item in the "items" array public void calcWithRecursion(int item) { for (int i = 0; i <= maxIt[item]; i++) { iIt[item] = i; if (item < n-1) { calcWithRecursion(item+1); } else { int currVal = 0; // current value double currWei = 0.0; // current weight double currVol = 0.0; // current Volume for (int j = 0; j < n; j++) { currVal += iIt[j] * items[j].getValue(); currWei += iIt[j] * items[j].getWeight(); currVol += iIt[j] * items[j].getVolume(); }
if (currVal > best.getValue() && currWei <= sack.getWeight() && currVol <= sack.getVolume() ) { best.setValue (currVal); best.setWeight(currWei); best.setVolume(currVol); for (int j = 0; j < n; j++) bestAm[j] = iIt[j]; } // if (...) } // else } // for (i) } // calcWithRecursion()
// the main() function: public static void main(String[] args) { new UnboundedKnapsack(); } // main()
} // class</lang>
<lang java>package hu.pj.obj;
public class Item {
protected String name = ""; protected int value = 0; protected double weight = 0; protected double volume = 0;
public Item() { }
public Item(String name, int value, double weight, double volume) { setName(name); setValue(value); setWeight(weight); setVolume(volume); }
public int getValue() { return value; }
public void setValue(int value) { this.value = Math.max(value, 0); }
public double getWeight() { return weight; }
public void setWeight(double weight) { this.weight = Math.max(weight, 0); }
public double getVolume() { return volume; }
public void setVolume(double volume) { this.volume = Math.max(volume, 0); }
public String getName() { return name; }
public void setName(String name) { this.name = name; }
} // class</lang>
output:
Maximum value achievable is: 54500 This is achieved by carrying (one solution): 0 panacea, 15 ichor, 11 gold, The weight to carry is: 25 and the volume used is: 0,247
JavaScript
Brute force.
<lang javascript>var gold = { 'value': 2500, 'weight': 2.0, 'volume': 0.002 },
panacea = { 'value': 3000, 'weight': 0.3, 'volume': 0.025 }, ichor = { 'value': 1800, 'weight': 0.2, 'volume': 0.015 }, items = [gold, panacea, ichor], knapsack = {'weight': 25, 'volume': 0.25}, max_val = 0, solutions = [], g, p, i, item, val;
for (i = 0; i < items.length; i += 1) {
item = items[i]; item.max = Math.min( Math.floor(knapsack.weight / item.weight), Math.floor(knapsack.volume / item.volume) );
}
for (g = 0; g <= gold.max; g += 1) {
for (p = 0; p <= panacea.max; p += 1) { for (i = 0; i <= ichor.max; i += 1) { if (i * ichor.weight + g * gold.weight + p * panacea.weight > knapsack.weight) { continue; } if (i * ichor.volume + g * gold.volume + p * panacea.volume > knapsack.volume) { continue; } val = i * ichor.value + g * gold.value + p * panacea.value; if (val > max_val) { solutions = []; max_val = val; } if (val === max_val) { solutions.push([g, p, i]); } } }
}
document.write("maximum value: " + max_val + '
');
for (i = 0; i < solutions.length; i += 1) {
item = solutions[i]; document.write("(gold: " + item[0] + ", panacea: " + item[1] + ", ichor: " + item[2] + ")
");
}
output:
maximum value: 54500 (gold: 11, panacea: 0, ichor: 15) (gold: 11, panacea: 3, ichor: 10) (gold: 11, panacea: 6, ichor: 5) (gold: 11, panacea: 9, ichor: 0)
</lang>
M4
A brute force solution: <lang M4>divert(-1) define(`set2d',`define(`$1[$2][$3]',`$4')') define(`get2d',`defn(`$1[$2][$3]')') define(`for',
`ifelse($#,0,``$0, `ifelse(eval($2<=$3),1, `pushdef(`$1',$2)$4`'popdef(`$1')$0(`$1',incr($2),$3,`$4')')')')
define(`min',
`define(`ma',eval($1))`'define(`mb',eval($2))`'ifelse(eval(ma<mb),1,ma,mb)')
define(`setv',
`set2d($1,$2,1,$3)`'set2d($1,$2,2,$4)`'set2d($1,$2,3,$5)`'set2d($1,$2,4,$6)')
dnl name,value (each),weight,volume setv(a,0,`knapsack',0,250,250) setv(a,1,`panacea',3000,3,25) setv(a,2,`ichor',1800,2,15) setv(a,3,`gold',2500,20,2)
define(`mv',0) for(`x',0,min(get2d(a,0,3)/get2d(a,1,3),get2d(a,0,4)/get2d(a,1,4)),
`for(`y',0,min((get2d(a,0,3)-x*get2d(a,1,3))/get2d(a,2,3), (get2d(a,0,4)-x*get2d(a,1,4))/get2d(a,2,4)), `
define(`z',min((get2d(a,0,3)-x*get2d(a,1,3)-y*get2d(a,2,3))/get2d(a,3,3),
(get2d(a,0,4)-x*get2d(a,1,4)-y*get2d(a,2,4))/get2d(a,3,4)))
define(`cv',eval(x*get2d(a,1,2)+y*get2d(a,2,2)+z*get2d(a,3,2))) ifelse(eval(cv>mv),1,
`define(`mv',cv)`'define(`best',(x,y,z))', `ifelse(cv,mv,`define(`best',best (x,y,z))')') ')')
divert mv best</lang>
Output:
54500 (0,15,11) (3,10,11) (6,5,11) (9,0,11)
Lua
<lang lua>items = { ["panaea"] = { ["value"] = 3000, ["weight"] = 0.3, ["volume"] = 0.025 },
["ichor"] = { ["value"] = 1800, ["weight"] = 0.2, ["volume"] = 0.015 }, ["gold"] = { ["value"] = 2500, ["weight"] = 2.0, ["volume"] = 0.002 } }
max_weight = 25 max_volume = 0.25
max_num_items = {} for i in pairs( items ) do
max_num_items[i] = math.floor( math.min( max_weight / items[i].weight, max_volume / items[i].volume ) )
end
best = { ["value"] = 0.0, ["weight"] = 0.0, ["volume"] = 0.0 } best_amounts = {}
for i = 1, max_num_items["panaea"] do
for j = 1, max_num_items["ichor"] do for k = 1, max_num_items["gold"] do current = { ["value"] = i*items["panaea"]["value"] + j*items["ichor"]["value"] + k*items["gold"]["value"], ["weight"] = i*items["panaea"]["weight"] + j*items["ichor"]["weight"] + k*items["gold"]["weight"], ["volume"] = i*items["panaea"]["volume"] + j*items["ichor"]["volume"] + k*items["gold"]["volume"] } if current.value > best.value and current.weight <= max_weight and current.volume <= max_volume then best = { ["value"] = current.value, ["weight"] = current.weight, ["volume"] = current.volume } best_amounts = { ["panaea"] = i, ["ichor"] = j, ["gold"] = k } end end end
end
print( "Maximum value:", best.value ) for k, v in pairs( best_amounts ) do
print( k, v )
end</lang>
Mathematica
Brute force algorithm: <lang Mathematica>{pva,pwe,pvo}={3000,3/10,1/40}; {iva,iwe,ivo}={1800,2/10,3/200}; {gva,gwe,gvo}={2500,2,2/1000}; wemax=25; vomax=1/4; {pmax,imax,gmax}=Floor/@{Min[vomax/pvo,wemax/pwe],Min[vomax/ivo,wemax/iwe],Min[vomax/gvo,wemax/gwe]};
data=Flatten[Table[{{p,i,g}.{pva,iva,gva},{p,i,g}.{pwe,iwe,gwe},{p,i,g}.{pvo,ivo,gvo},{p,i,g}},{p,0,pmax},{i,0,imax},{g,0,gmax}],2]; data=Select[data,#2<=25&<=1/4&]; First[SplitBy[Sort[data,First[#1]>First[#2]&],First]]</lang> gives back an array of the best solution(s), with each element being value, weight, volume, {number of vials, number of ampules, number of bars}: <lang Mathematica>{{54500,247/10,247/1000,{9,0,11}},{54500,124/5,247/1000,{6,5,11}},{54500,249/10,247/1000,{3,10,11}},{54500,25,247/1000,{0,15,11}}}</lang> if we call the three items by their first letters the best packings are: <lang Mathematica>p:9 i:0 v:11 p:6 i:5 v:11 p:3 i:10 v:11 p:0 i:15 v:11</lang> The volume for all of those is the same, the 'best' solution would be the one that has the least weight: that would the first solution.
Modula-3
Note that unlike Fortran and C, Modula-3 does not do any hidden casting, which is why FLOAT and FLOOR are used. <lang modula3>MODULE Knapsack EXPORTS Main;
FROM IO IMPORT Put; FROM Fmt IMPORT Int, Real;
TYPE Bounty = RECORD
value: INTEGER; weight, volume: REAL;
END;
VAR totalWeight, totalVolume: REAL;
maxPanacea, maxIchor, maxGold, maxValue: INTEGER := 0; n: ARRAY [1..3] OF INTEGER; panacea, ichor, gold, sack, current: Bounty;
BEGIN
panacea := Bounty{3000, 0.3, 0.025}; ichor := Bounty{1800, 0.2, 0.015}; gold := Bounty{2500, 2.0, 0.002}; sack := Bounty{0, 25.0, 0.25};
maxPanacea := FLOOR(MIN(sack.weight / panacea.weight, sack.volume / panacea.volume)); maxIchor := FLOOR(MIN(sack.weight / ichor.weight, sack.volume / ichor.volume)); maxGold := FLOOR(MIN(sack.weight / gold.weight, sack.volume / gold.volume));
FOR i := 0 TO maxPanacea DO FOR j := 0 TO maxIchor DO FOR k := 0 TO maxGold DO current.value := k * gold.value + j * ichor.value + i * panacea.value; current.weight := FLOAT(k) * gold.weight + FLOAT(j) * ichor.weight + FLOAT(i) * panacea.weight; current.volume := FLOAT(k) * gold.volume + FLOAT(j) * ichor.volume + FLOAT(i) * panacea.volume; IF current.weight > sack.weight OR current.volume > sack.volume THEN EXIT; END; IF current.value > maxValue THEN maxValue := current.value; totalWeight := current.weight; totalVolume := current.volume; n[1] := i; n[2] := j; n[3] := k; END; END; END; END; Put("Maximum value achievable is " & Int(maxValue) & "\n"); Put("This is achieved by carrying " & Int(n[1]) & " panacea, " & Int(n[2]) & " ichor and " & Int(n[3]) & " gold items\n"); Put("The weight of this carry is " & Real(totalWeight) & " and the volume used is " & Real(totalVolume) & "\n");
END Knapsack.</lang>
Output:
Maximum value achievable is 54500 This is achieved by carrying 0 panacea, 15 ichor and 11 gold items The weight of this carry is 25 and the volume used is 0.247
OCaml
This is a brute-force solution: it generates a list of every legal combination of items and then finds the best results:
<lang ocaml>type bounty = { name:string; value:int; weight:float; volume:float }
let bounty n d w v = { name = n; value = d; weight = w; volume = v }
let items =
[ bounty "panacea" 3000 0.3 0.025; bounty "ichor" 1800 0.2 0.015; bounty "gold" 2500 2.0 0.002; ]
let max_wgt = 25.0 and max_vol = 0.25
let itmax =
let f it = let rec aux n = if float n *. it.weight >= max_wgt || float n *. it.volume >= max_vol then (n) else aux (succ n) in aux 0 in List.map f items
let mklist n m =
let rec aux i acc = if i > m then (List.rev acc) else aux (succ i) (i::acc) in aux n []
let comb_items = List.map (mklist 0) itmax
let combs ll =
let f hd acc = List.concat (List.map (fun l -> List.map (fun v -> (v::l)) hd) acc) in List.fold_right f ll [[]]
let possibles = combs comb_items
let packs =
let f l = let g (v, wgt, vol) n it = (v + n * it.value, wgt +. float n *. it.weight, vol +. float n *. it.volume) in List.fold_left2 g (0, 0.0, 0.0) l items in List.map f possibles
let packs = List.combine packs possibles
let results =
let f (_, wgt, vol) = (wgt <= max_wgt && vol <= max_vol) in List.filter (fun v -> f(fst v)) packs
let best_results =
let max_value = List.fold_left (fun v1 ((v2,_,_),_) -> max v1 v2) 0 results in List.filter (fun ((v,_,_),_) -> v = max_value) results
let items_name = List.map (fun it -> it.name) items
let print ((v, wgt, vol), ns) =
Printf.printf "\ Maximum value: %d \n \ Total weight: %g \n \ Total volume: %g \n \ Containing: " v wgt vol; let f n name = string_of_int n ^ " " ^ name in let ss = List.map2 f ns items_name in print_endline(String.concat ", " ss); print_newline()
let () = List.iter print best_results</lang>
outputs:
Maximum value: 54500 Total weight: 24.7 Total volume: 0.247 Containing: 9 panacea, 0 ichor, 11 gold Maximum value: 54500 Total weight: 24.8 Total volume: 0.247 Containing: 6 panacea, 5 ichor, 11 gold Maximum value: 54500 Total weight: 24.9 Total volume: 0.247 Containing: 3 panacea, 10 ichor, 11 gold Maximum value: 54500 Total weight: 25 Total volume: 0.247 Containing: 0 panacea, 15 ichor, 11 gold
OOCalc
OpenOffice calc has (several) linear solvers. To solve this task, first copy in the table from the task description, then add the extra columns:
- Number: (How many chosen, n)
- value of n
- weight of n
- volume of n
Add a TOTALS row to sum the value/weight/volume of n.
The sheet should then look like this:
Open the "Tools->Solver..." menu item and fill in the following items:
- Options... (opens a separate popup window, then continue)
OK the solver options window leaving the Solver window open, then select solve to produce in seconds:
Oz
Using constraint propagation and branch and bound search: <lang oz>declare
proc {Knapsack Sol} solution(panacea:P = {FD.decl} ichor: I = {FD.decl} gold: G = {FD.decl} ) = Sol in {Show 0#Sol} 3 * P + 2 * I + 20 * G =<: 250 {Show 1#Sol} 25 * P + 15 * I + 2 * G =<: 250 {Show 2#Sol} {FD.distribute naive Sol} {Show d#Sol} end
fun {Value solution(panacea:P ichor:I gold:G)} 3000 * P + 1800 * I + 2500 * G end
{System.showInfo "Search:"} [Best] = {SearchBest Knapsack proc {$ Old New} {Value Old} <: {Value New} end}
in
{System.showInfo "\nResult:"} {Show Best} {System.showInfo "total value: "#{Value Best}}</lang>
If you study the output, you see how the weight and volume equations automagically constrain the domain of the three variables. Afterwards SearchBest only has to evaluate 38 different combinations to find an optimal solution:
Search: 0#solution(gold:_{0#134217726} ichor:_{0#134217726} panacea:_{0#134217726}) 1#solution(gold:_{0#12} ichor:_{0#125} panacea:_{0#83}) 2#solution(gold:_{0#12} ichor:_{0#16} panacea:_{0#10}) d#solution(gold:0 ichor:0 panacea:0) d#solution(gold:0 ichor:1 panacea:0) d#solution(gold:0 ichor:2 panacea:0) d#solution(gold:0 ichor:3 panacea:0) d#solution(gold:0 ichor:4 panacea:0) d#solution(gold:0 ichor:5 panacea:0) d#solution(gold:0 ichor:6 panacea:0) d#solution(gold:0 ichor:7 panacea:0) d#solution(gold:0 ichor:8 panacea:0) d#solution(gold:0 ichor:9 panacea:0) d#solution(gold:0 ichor:10 panacea:0) d#solution(gold:0 ichor:11 panacea:0) d#solution(gold:0 ichor:12 panacea:0) d#solution(gold:0 ichor:13 panacea:0) d#solution(gold:0 ichor:14 panacea:0) d#solution(gold:0 ichor:15 panacea:0) d#solution(gold:0 ichor:16 panacea:0) d#solution(gold:1 ichor:15 panacea:0) d#solution(gold:1 ichor:16 panacea:0) d#solution(gold:2 ichor:15 panacea:0) d#solution(gold:2 ichor:16 panacea:0) d#solution(gold:3 ichor:15 panacea:0) d#solution(gold:3 ichor:16 panacea:0) d#solution(gold:4 ichor:15 panacea:0) d#solution(gold:4 ichor:16 panacea:0) d#solution(gold:5 ichor:15 panacea:0) d#solution(gold:5 ichor:16 panacea:0) d#solution(gold:6 ichor:15 panacea:0) d#solution(gold:7 ichor:14 panacea:0) d#solution(gold:7 ichor:15 panacea:0) d#solution(gold:8 ichor:14 panacea:0) d#solution(gold:8 ichor:15 panacea:0) d#solution(gold:9 ichor:14 panacea:0) d#solution(gold:9 ichor:15 panacea:0) d#solution(gold:10 ichor:14 panacea:0) d#solution(gold:10 ichor:15 panacea:0) d#solution(gold:11 ichor:14 panacea:0) d#solution(gold:11 ichor:15 panacea:0) Result: solution(gold:11 ichor:15 panacea:0) total value: 54500
Pascal
With ideas from C, Fortran and Modula2. <lang pascal>Program Knapsack(output);
uses
math;
type
bounty = record value: longint; weight, volume: real; end;
const
panacea: bounty = (value:3000; weight: 0.3; volume: 0.025); ichor: bounty = (value:1800; weight: 0.2; volume: 0.015); gold: bounty = (value:2500; weight: 2.0; volume: 0.002); sack: bounty = (value: 0; weight: 25.0; volume: 0.25);
var
totalweight, totalvolume: real; maxpanacea, maxichor, maxgold: longint; maxvalue: longint = 0; n: array [1..3] of longint; current: bounty; i, j, k: longint;
begin
maxpanacea := round(min(sack.weight / panacea.weight, sack.volume / panacea.volume)); maxichor := round(min(sack.weight / ichor.weight, sack.volume / ichor.volume)); maxgold := round(min(sack.weight / gold.weight, sack.volume / gold.volume)); for i := 0 to maxpanacea do for j := 0 to maxichor do for k := 0 to maxgold do begin current.value := k * gold.value + j * ichor.value + i * panacea.value; current.weight := k * gold.weight + j * ichor.weight + i * panacea.weight; current.volume := k * gold.volume + j * ichor.volume + i * panacea.volume; if (current.value > maxvalue) and
(current.weight <= sack.weight) and
(current.volume <= sack.volume) then
begin
maxvalue := current.value; totalweight := current.weight; totalvolume := current.volume; n[1] := i;
n[2] := j; n[3] := k;
end; end;
writeln ('Maximum value achievable is ', maxValue); writeln ('This is achieved by carrying ', n[1], ' panacea, ', n[2], ' ichor and ', n[3], ' gold items'); writeln ('The weight of this carry is ', totalWeight:6:3, ' and the volume used is ', totalVolume:6:4);
end.</lang> Output:
:> ./Knapsack Maximum value achievable is 54500 This is achieved by carrying 0 panacea, 15 ichor and 11 gold items The weight of this carry is 25.000 and the volume used is 0.2470
Perl
Dynamic programming solution. Before you ask, no, it's actually slower for the given data set. See the alternate data set. <lang perl>my (@names, @val, @weight, @vol, $max_vol, $max_weight, $vsc, $wsc);
if (1) { # change 1 to 0 for different data set
@names = qw(panacea icor gold); @val = qw(3000 1800 2500); @weight = qw(3 2 20 ); @vol = qw(25 15 2 ); $max_weight = 250; $max_vol = 250; $vsc = 1000; $wsc = 10;
} else { # with these numbers cache would have been useful
@names = qw(panacea icor gold banana monkey ); @val = qw(17 11 5 3 34 ); @weight = qw(14 3 2 2 10 ); @vol = qw(3 4 2 1 12 ); $max_weight = 150; $max_vol = 100; $vsc = $wsc = 1;
}
my @cache; my ($hits, $misses) = (0, 0); sub solu {
my ($i, $w, $v) = @_; return [0, []] if $i < 0;
if ($cache[$i][$w][$v]) { $hits ++; return $cache[$i][$w][$v] } $misses ++;
my $x = solu($i - 1, $w, $v);
my ($w1, $v1); for (my $t = 1; ; $t++) { last if ($w1 = $w - $t * $weight[$i]) < 0; last if ($v1 = $v - $t * $vol[$i]) < 0;
my $y = solu($i - 1, $w1, $v1);
if ( (my $tmp = $y->[0] + $val[$i] * $t) > $x->[0] ) { $x = [ $tmp, [ @{$y->[1]}, [$i, $t] ] ]; } }
$cache[$i][$w][$v] = $x
}
my $x = solu($#names, $max_weight, $max_vol); print "Max value $x->[0], with:\n",
" Item\tQty\tWeight Vol Value\n", '-'x 50, "\n";
my ($wtot, $vtot) = (0, 0); for (@{$x->[1]}) {
my $i = $_->[0]; printf " $names[$i]:\t% 3d % 8d% 8g% 8d\n", $_->[1], $weight[$i] * $_->[1] / $wsc, $vol[$i] * $_->[1] / $vsc, $val[$i] * $_->[1];
$wtot += $weight[$i] * $_->[1]; $vtot += $vol[$i] * $_->[1];
} print "-" x 50, "\n"; printf " Total:\t % 8d% 8g% 8d\n",
$wtot/$wsc, $vtot/$vsc, $x->[0];
print "\nCache hit: $hits\tmiss: $misses\n";</lang>
Output:
Max value 54500, with: Item Qty Weight Vol Value -------------------------------------------------- panacea: 9 2 0.225 27000 gold: 11 22 0.022 27500 -------------------------------------------------- Total: 24 0.247 54500 Cache hit: 0 miss: 218
Cache info is not pertinent to this task, just some info.
PicoLisp
Brute force solution <lang PicoLisp>(de *Items
("panacea" 3 25 3000) ("ichor" 2 15 1800) ("gold" 20 2 2500) )
(de knapsack (Lst W V)
(when Lst (let X (knapsack (cdr Lst) W V) (if (and (ge0 (dec 'W (cadar Lst))) (ge0 (dec 'V (caddar Lst)))) (maxi '((L) (sum cadddr L)) (list X (cons (car Lst) (knapsack (cdr Lst) W V)) (cons (car Lst) (knapsack Lst W V)) ) ) X ) ) ) )
(let K (knapsack *Items 250 250)
(for (L K L) (let (N 1 X) (while (= (setq X (pop 'L)) (car L)) (inc 'N) ) (apply tab X (4 2 8 5 5 7) N "x") ) ) (tab (14 5 5 7) NIL (sum cadr K) (sum caddr K) (sum cadddr K)) )</lang>
Output:
15 x ichor 2 15 1800 11 x gold 20 2 2500 250 247 54500
Prolog
Works with SWI-Prolog and library simplex written by Markus Triska.
<lang Prolol>:- use_module(library(simplex)).
% tuples (name, Explantion, Value, weights, volume). knapsack :- L =[( panacea, 'Incredible healing properties', 3000, 0.3, 0.025), ( ichor, 'Vampires blood', 1800, 0.2, 0.015), ( gold , 'Shiney shiney', 2500, 2.0, 0.002)],
gen_state(S0), length(L, N), numlist(1, N, LN),
% to get statistics time((create_constraint_N(LN, L, S0, S1, [], LVa, [], LW, [], LVo), constraint(LW =< 25.0, S1, S2), constraint(LVo =< 0.25, S2, S3), maximize(LVa, S3, S4) )),
% we display the results compute_lenword(L, 0, Len), sformat(A0, '~~w~~t~~~w|', [3]), sformat(A1, '~~w~~t~~~w|', [Len]), sformat(A2, '~~t~~w~~~w|', [10]), sformat(A3, '~~t~~2f~~~w|', [10]), sformat(A4, '~~t~~3f~~~w|', [10]), sformat(A33, '~~t~~w~~~w|', [10]), sformat(A44, '~~t~~w~~~w|', [10]),
sformat(W0, A0, ['Nb']), sformat(W1, A1, ['Items']), sformat(W2, A2, ['Value']), sformat(W3, A33, ['Weigth']), sformat(W4, A44, ['Volume']), format('~w~w~w~w~w~n', [W0, W1,W2,W3,W4]),
print_results(S4, A0, A1, A2, A3, A4, L, LN, 0, 0, 0).
create_constraint_N([], [], S, S, LVa, LVa, LW, LW, LVo, LVo).
create_constraint_N([HN|TN], [(_, _,Va, W, Vo) | TL], S1, SF, LVa, LVaF, LW, LWF, LVo, LVoF) :- constraint(integral(x(HN)), S1, S2), constraint([x(HN)] >= 0, S2, S3), create_constraint_N(TN, TL, S3, SF, [Va * x(HN) | LVa], LVaF, [W * x(HN) | LW], LWF, [Vo * x(HN) | LVo], LVoF).
%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
%
compute_lenword([], N, N).
compute_lenword([(Name, _, _, _, _)|T], N, NF):-
atom_length(Name, L),
( L > N -> N1 = L; N1 = N),
compute_lenword(T, N1, NF).
%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% % print_results(_S, A0, A1, A2, A3, A4, [], [], VaM, WM, VoM) :- sformat(W0, A0, [' ']), sformat(W1, A1, [' ']), sformat(W2, A2, [VaM]), sformat(W3, A3, [WM]), sformat(W4, A4, [VoM]), format('~w~w~w~w~w~n', [W0, W1,W2,W3,W4]).
print_results(S, A0, A1, A2, A3, A4, [(Name, _, Va, W, Vo)|T], [N|TN], Va1, W1, Vo1) :-
variable_value(S, x(N), X),
( X = 0 -> Va1 = Va2, W1 = W2, Vo1 = Vo2
;
sformat(S0, A0, [X]),
sformat(S1, A1, [Name]),
Vatemp is X * Va,
Wtemp is X * W,
Votemp is X * Vo,
sformat(S2, A2, [Vatemp]),
sformat(S3, A3, [Wtemp]),
sformat(S4, A4, [Votemp]),
format('~w~w~w~w~w~n', [S0,S1,S2,S3,S4]),
Va2 is Va1 + Vatemp,
W2 is W1 + Wtemp,
Vo2 is Vo1 + Votemp ),
print_results(S, A0, A1, A2, A3, A4, T, TN, Va2, W2, Vo2).
</lang>
Output :
?- knapsack. % 145,319 inferences, 0.078 CPU in 0.079 seconds (99% CPU, 1860083 Lips) Nb Items Value Weigth Volume 15 ichor 27000 3.00 0.225 11 gold 27500 22.00 0.022 54500 25.00 0.247 true
PureBasic
<lang PureBasic>Define.f TotalWeight, TotalVolyme Define.i maxPanacea, maxIchor, maxGold, maxValue Define.i i, j ,k Dim n.i(2)
Enumeration
#Panacea #Ichor #Gold #Sack #Current
EndEnumeration
Structure Bounty
value.i weight.f volyme.f
EndStructure
Dim Item.Bounty(4) CopyMemory(?panacea,@Item(#Panacea),SizeOf(Bounty)) CopyMemory(?ichor, @Item(#Ichor), SizeOf(Bounty)) CopyMemory(?gold, @Item(#gold), SizeOf(Bounty)) CopyMemory(?sack, @Item(#Sack), SizeOf(Bounty))
Procedure.f min(a.f, b.f)
If aItem(#Sack)\weight Or Item(#Current)\volyme>Item(#Sack)\volyme Continue EndIf If Item(#Current)\value>maxValue maxValue=Item(#Current)\value TotalWeight=Item(#Current)\weight TotalVolyme=Item(#Current)\volyme n(#Panacea)=i: n(#Ichor)=j: n(#Gold)=k EndIf Next k Next j
Next i
If OpenConsole()
Define txt$ txt$="Maximum value achievable is "+Str(maxValue)+#CRLF$ txt$+"This is achieved by carrying "+Str(n(#Panacea))+" panacea, " txt$+Str(n(#Ichor))+" ichor and "+Str(n(#Gold))+" gold items."+#CRLF$ txt$+"The weight to carry is "+StrF(totalWeight,2) txt$+" and the volume used is "+StrF(TotalVolyme,2) PrintN(txt$) Print(#CRLF$+"Press Enter to quit"): Input()
EndIf
DataSection panacea:
Data.i 3000 Data.f 0.3, 0.025
ichor:
Data.i 1800 Data.f 0.2, 0.015
gold:
Data.i 2500 Data.f 2.0, 0.002
sack:
Data.i 0 Data.f 25.0, 0.25
EndDataSection</lang>
Outputs
Maximum value achievable is 54500 This is achieved by carrying 0 panacea, 15 ichor and 11 gold items The weight to carry is 25.00 and the volume used is 0.25 Press Enter to quit
Python
R
Brute force method <lang r># Define consts weights <- c(panacea=0.3, ichor=0.2, gold=2.0) volumes <- c(panacea=0.025, ichor=0.015, gold=0.002) values <- c(panacea=3000, ichor=1800, gold=2500) sack.weight <- 25 sack.volume <- 0.25 max.items <- floor(pmin(sack.weight/weights, sack.volume/volumes))
- Some utility functions
getTotalValue <- function(n) sum(n*values) getTotalWeight <- function(n) sum(n*weights) getTotalVolume <- function(n) sum(n*volumes) willFitInSack <- function(n) getTotalWeight(n) <= sack.weight && getTotalVolume(n) <= sack.volume
- Find all possible combination, then eliminate those that won't fit in the sack
knapsack <- expand.grid(lapply(max.items, function(n) seq.int(0, n))) ok <- apply(knapsack, 1, willFitInSack) knapok <- knapsack[ok,]
- Find the solutions with the highest value
vals <- apply(knapok, 1, getTotalValue) knapok[vals == max(vals),]</lang>
panacea ichor gold 2067 9 0 11 2119 6 5 11 2171 3 10 11 2223 0 15 11
REXX
(Any resemblence to the Fortran code is 110% coincidental.) <lang rexx> /*REXX program to solve the knapsack/unbounded problem. */
maxPanacea=0 maxIchor =0 maxGold =0 max$ =0 current. =0
/* value weight volume */ /* ------- ------- ------ */
panacea.$= 3000 ; panacea.w= 0.3 ; panacea.v= 0.025
ichor.$= 1800 ; ichor.w= 0.2 ; ichor.v= 0.015 gold.$= 2500 ; gold.w= 2 ; gold.v= 0.002 sack.$= 0 ; sack.w= 25 ; sack.v= 0.25
maxPanacea = min(sack.w/panacea.w, sack.v/panacea.v) maxIchor = min(sack.w/ ichor.w, sack.v/ ichor.v) maxGold = min(sack.w/ gold.w, sack.v/ gold.v)
do p=0 to maxpanacea do i=0 to maxichor do g=0 to maxgold
current.$=g*gold.$ + i*ichor.$ + p*panacea.$ current.w=g*gold.w + i*ichor.w + p*panacea.w current.v=g*gold.v + i*ichor.v + p*panacea.v
if current.w>sack.w | current.v>sack.v then iterate
if current.$>max$ then do max$ = current.$ totalW = current.w totalV = current.v maxP=p; maxI=i; maxG=g end end /*g (gold) */ end /*i (ichor) */ end /*p (panacea)*/
say
cTot=maxP+maxI+maxG L=length(cTot)+1 say ' panacea in sack:' right(maxP,L) say ' ichors in sack:' right(maxI,L) say ' gold items in sack:' right(maxG,L) say '====================' copies('=',L) say 'carrying a total of:' right(cTot,L) say say 'total value:' (max$)/1 say 'total weight:' (totalW/1) say 'total volume:' (totalV/1) exit </lang> Output:
panacea in sack: 0 ichors in sack: 15 gold items in sack: 11 ==================== === carrying a total of: 26 total value: 54500 total weight: 25 total volume: 0.247
Ruby
Brute force method,
<lang ruby>KnapsackItem = Struct.new(:volume, :weight, :value) panacea = KnapsackItem.new(0.025, 0.3, 3000) ichor = KnapsackItem.new(0.015, 0.2, 1800) gold = KnapsackItem.new(0.002, 2.0, 2500) maximum = KnapsackItem.new(0.25, 25, 0)
max_items = {} for item in [panacea, ichor, gold]
max_items[item] = [(maximum.volume/item.volume).to_i, (maximum.weight/item.weight).to_i].min
end
maxval = 0 solutions = []
0.upto(max_items[ichor]) do |i|
0.upto(max_items[panacea]) do |p| 0.upto(max_items[gold]) do |g| next if i*ichor.weight + p*panacea.weight + g*gold.weight > maximum.weight next if i*ichor.volume + p*panacea.volume + g*gold.volume > maximum.volume val = i*ichor.value + p*panacea.value + g*gold.value if val > maxval maxval = val solutions = i, p, g elsif val == maxval solutions << [i, p, g] end end end
end
puts "The maximal solution has value #{maxval}" solutions.each do |i, p, g|
printf " ichor=%2d, panacea=%2d, gold=%2d -- weight:%.1f, volume=%.3f\n", i, p, g, i*ichor.weight + p*panacea.weight + g*gold.weight, i*ichor.volume + p*panacea.volume + g*gold.volume
end</lang>
The maximal solution has value 54500 ichor= 0, panacea= 9, gold=11 -- weight:24.7, volume=0.247 ichor= 5, panacea= 6, gold=11 -- weight:24.8, volume=0.247 ichor=10, panacea= 3, gold=11 -- weight:24.9, volume=0.247 ichor=15, panacea= 0, gold=11 -- weight:25.0, volume=0.247
SAS
This is yet another brute force solution. <lang SAS> data one;
wtpanacea=0.3; wtichor=0.2; wtgold=2.0; volpanacea=0.025; volichor=0.015; volgold=0.002; valpanacea=3000; valichor=1800; valgold=2500; maxwt=25; maxvol=0.25;
/* we can prune the possible selections */ maxpanacea = floor(min(maxwt/wtpanacea, maxvol/volpanacea)); maxichor = floor(min(maxwt/wtichor, maxvol/volichor)); maxgold = floor(min(maxwt/wtgold, maxvol/volgold)); do i1 = 0 to maxpanacea; do i2 = 0 to maxichor; do i3 = 0 to maxgold; panacea = i1; ichor=i2; gold=i3; output; end; end; end;
run; data one; set one;
vals = valpanacea*panacea + valichor*ichor + valgold*gold; totalweight = wtpanacea*panacea + wtichor*ichor + wtgold*gold; totalvolume = volpanacea*panacea + volichor*ichor + volgold*gold; if (totalweight le maxwt) and (totalvolume le maxvol);
run; proc sort data=one;
by descending vals;
run; proc print data=one (obs=4);
var panacea ichor gold vals;
run; </lang>
Obs panacea ichor gold vals 1 0 15 11 54500 2 3 10 11 54500 3 6 5 11 54500 4 9 0 11 54500
Tcl
The following code uses brute force, but that's tolerable as long as it takes just a split second to find all 4 solutions. The use of arrays makes the quote quite legible: <lang Tcl>#!/usr/bin/env tclsh proc main argv {
array set value {panacea 3000 ichor 1800 gold 2500} array set weight {panacea 0.3 ichor 0.2 gold 2.0 max 25} array set volume {panacea 0.025 ichor 0.015 gold 0.002 max 0.25}
foreach i {panacea ichor gold} { set max($i) [expr {min(int($volume(max)/$volume($i)), int($weight(max)/$weight($i)))}] } set maxval 0 for {set i 0} {$i < $max(ichor)} {incr i} { for {set p 0} {$p < $max(panacea)} {incr p} { for {set g 0} {$g < $max(gold)} {incr g} { if {$i*$weight(ichor) + $p*$weight(panacea) + $g*$weight(gold) > $weight(max)} continue if {$i*$volume(ichor) + $p*$volume(panacea) + $g*$volume(gold) > $volume(max)} continue set val [expr {$i*$value(ichor)+$p*$value(panacea)+$g*$value(gold)}] if {$val == $maxval} { lappend best [list i $i p $p g $g] } elseif {$val > $maxval} { set maxval $val set best [list [list i $i p $p g $g]] } } } } puts "maxval: $maxval, best: $best"
} main $argv</lang>
$ time tclsh85 /Tcl/knapsack.tcl maxval: 54500, best: {i 0 p 9 g 11} {i 5 p 6 g 11} {i 10 p 3 g 11} {i 15 p 0 g 11} real 0m0.188s user 0m0.015s sys 0m0.015s
Ursala
The algorithm is to enumerate all packings with up to the maximum of each item, filter them by the volume and weight restrictions, partition the remaining packings by value, and search for the maximum value class. <lang Ursala>#import nat
- import flo
vol = iprod/<0.025,0.015,0.002>+ float* val = iprod/<3000.,1800.,2500.>+ float* wgt = iprod/<0.3,0.2,2.0>+ float*
packings = ~&lrlrNCCPCS ~&K0=> iota* <11,17,13>
solutions = fleq$^rS&hl |=&l ^(val,~&)* (fleq\25.+ wgt)*~ (fleq\0.25+ vol)*~ packings
- cast %nmL
human_readable = ~&p/*<'panacea','ichor','gold'> solutions</lang> output:
< <'panacea': 0,'ichor': 15,'gold': 11>, <'panacea': 3,'ichor': 10,'gold': 11>, <'panacea': 6,'ichor': 5,'gold': 11>, <'panacea': 9,'ichor': 0,'gold': 11>>