In this paper,following the method of replacing the lower level problem with its Kuhn-Tucker optimality condition,we transform the nonlinear bilevel programming problem into a normal nonlinear programming problem with...In this paper,following the method of replacing the lower level problem with its Kuhn-Tucker optimality condition,we transform the nonlinear bilevel programming problem into a normal nonlinear programming problem with the complementary slackness constraint condition.Then,we get the penalized problem of the normal nonlinear programming problem by appending the complementary slackness condition to the upper level objective with a penalty.We prove that this penalty function is exact and the penalized problem and the nonlinear bilevel programming problem have the same global optimal solution set.Finally,we propose an algorithm for the nonlinear bilevel programming problem.The numerical results show that the algorithm is feasible and efficient.展开更多
在有界闭箱中对非线性混合整数规划问题进行探讨和研究,为避开文献[1]的连续化方法中含有非光滑罚函数的不足,采用连续可微罚函数sum from i=1 to π (sin^2πx_i),提出了非线性混合整数规划问题的一类光滑连续化方法,得到了几个定理,...在有界闭箱中对非线性混合整数规划问题进行探讨和研究,为避开文献[1]的连续化方法中含有非光滑罚函数的不足,采用连续可微罚函数sum from i=1 to π (sin^2πx_i),提出了非线性混合整数规划问题的一类光滑连续化方法,得到了几个定理,并给出证明.结果表明,可以将无约束和有约束的非线性混合整数规划问题转化为非线性连续全局优化问题求解,且改进了已有的结论.展开更多
基金Supported by the Key Project on Science and Technology of Hubei Provincial Department of Education (D20103001)
文摘In this paper,following the method of replacing the lower level problem with its Kuhn-Tucker optimality condition,we transform the nonlinear bilevel programming problem into a normal nonlinear programming problem with the complementary slackness constraint condition.Then,we get the penalized problem of the normal nonlinear programming problem by appending the complementary slackness condition to the upper level objective with a penalty.We prove that this penalty function is exact and the penalized problem and the nonlinear bilevel programming problem have the same global optimal solution set.Finally,we propose an algorithm for the nonlinear bilevel programming problem.The numerical results show that the algorithm is feasible and efficient.
文摘在有界闭箱中对非线性混合整数规划问题进行探讨和研究,为避开文献[1]的连续化方法中含有非光滑罚函数的不足,采用连续可微罚函数sum from i=1 to π (sin^2πx_i),提出了非线性混合整数规划问题的一类光滑连续化方法,得到了几个定理,并给出证明.结果表明,可以将无约束和有约束的非线性混合整数规划问题转化为非线性连续全局优化问题求解,且改进了已有的结论.