0-1背包使用python cplex [英] 0-1 knapsack using python cplex
问题描述
我正在尝试解决0-1背包问题的细微修改,其中每个项目都是从中选择一个值的值的向量,而不是使用Python Cplex的标量.这是 IBM OPL 解决方案,但无法找出如何使用
I'm trying to solve a slight modification of a 0-1 knapsack problem, where each item is a vector of values from which one value is chosen, instead of a scalar using Python Cplex. This is a variant of a Mixed integer problem. I wrote a IBM OPL solution to this problem, but unable to figure out how to solve it using Python Cplex. My solution using IBM OPL is:
int Capacity = 100; // Capacity of the knapsack
int k = 2; // Number of items
int n = 5; // Number of values
range values = 1..n;
range items = 1..k;
// parameters
int profit[items][values] = [[ 5, 10, 20, 20, 20], // only one item should be selected from this list
[ 5, 20, 25, 30, 40]]; // only one item should be selected from this list
int weight[values] = [ 10, 20, 50, 70, 80]; // Corresponding weights
// decision variable x[i][j]=1 if the jth item is selected
dvar boolean x[items][values];
// objective function
maximize sum(i in items, j in values) x[i][j] * p[i][j];
// constraints
subject to{
sum(i in items, j in values) x[i][j] * w[j] <= Capacity;
forall(i in items) sum(j in values) x[i][j] <= 1;
}
我们可以将这个问题作为oplrun -v knapsack.mod运行.解决此问题的方法是
We can run this problem as oplrun -v knapsack.mod. The solution to this problem is
x = [[0 1 0 0 0]
[0 0 0 0 1]];
profit = 10 + 40
= 50
问题的数学公式是:
我正在尝试使用Python CPLEX获得与上述相同的解决方案.以下代码是我尝试解决的问题,但它不正确.我不确定该如何解决:
I'm trying to get the same solution I got above using Python CPLEX. The following code is my try to solve the problem but it is not correct. I'm unsure of how to solve it:
import cplex
capacity = 100 # Capacity of the cache
k = 2 # Number of items
n = 5 # Number values for each item
profit = [[5, 10, 20, 20, 20],
[5, 10, 25, 30, 40]]
weight = [10, 20, 50, 70, 80]
xvar = [] # Will contain the solution
def setupproblem(c):
c.objective.set_sense(c.objective.sense.maximize)
# xvars[i][j] = 1 if ith item and jth value is selected
allxvars = []
for i in range(k):
xvar.append([])
for j in range(n):
varname = "assign_" + str(i) + "_" + str(j)
allxvars.append(varname)
xvar[i].append(varname)
# not sure how to formulate objective
c.variables.add(names=allxvars, lb=[0] * len(allxvars),
ub=[1] * len(allxvars))
# Exactly one value must be selected from each item
# and the corresponding weights must not exceed capacity
# Not sure about this too.
for j in range(k):
thevars = []
for i in range(n):
thevars.append(xvar[i][j])
c.linear_constraints.add(
lin_expr=[cplex.SparsePair(thevars, [1] * len(thevars))],
senses=["L"],
rhs=capacity)
def knapsack():
c = cplex.Cplex()
setupproblem(c)
c.solve()
sol = c.solution
if __name__ == "__main__":
knapsack()
推荐答案
您的问题是您没有指出要解决的程序是MIP.我不知道如何在Python下使用2d变量,但是以下工作原理:
Your problem is you didn't indicate that the program you solve is MIP. I don't know how to work with 2d variables under Python, but the following works:
import numpy as np
import cplex
from cplex import Cplex
from cplex.exceptions import CplexError
capacity = 100 # Capacity of the cache
k = 2 # Number of items
n = 5 # Number values for each item
profit = [[5, 10, 20, 20, 20],
[5, 10, 25, 30, 40]]
weight = [10, 20, 50, 70, 80]
xvar = [ [ 'x'+str(i)+str(j) for j in range(1,n+1) ] for i in range(1,k+1) ]
xvar = xvar[0] + xvar[1]
profit = profit[0] + profit[1]
types = 'B'*n*k
ub = [1]*n*k
lb = [0]*n*k
try:
prob = cplex.Cplex()
prob.objective.set_sense(prob.objective.sense.maximize)
prob.variables.add(obj = profit, lb = lb, ub = ub, types = types, names = xvar )
rows = [[ xvar, weight+weight ]]
rows = [[ xvar, weight+weight ],
[ xvar[:5], [1]*5 ],
[ xvar[5:], [1]*5 ],
]
prob.linear_constraints.add(lin_expr = rows, senses = 'LEE', rhs = [capacity,1,1], names = ['r1','r2','r3'] )
prob.solve()
print
print "Solution value = ", prob.solution.get_objective_value()
xsol = prob.solution.get_values()
print 'xsol = ', np.reshape(xsol, (k,n) )
except CplexError as exc:
print(exc)
我得到的答案:
Solution value = 50.0
xsol = [[ 0. 1. 0. 0. 0.]
[ 0. 0. 0. 0. 1.]]
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