We consider the problem of approximating an optimal solution to a separable, doubly infinite mathematical program (P) with lower staircase structure by solutions to the programs (P( N )) obtained by truncating after the first N variables and N constraints of (P). Viewing the surplus vector variable associated with the N th constraint as a state, and assuming that all feasible states are eventually reachable from any feasible state, we show that the efficient set of all solutions optimal to all possible feasible surplus states for (P( N )) converges to the set of optimal solutions to (P). A tie-breaking algorithm which selects a nearest-point efficient solution for (P( N )) is shown (for convex programs) to converge to an optimal solution to...
Models for long-term planning often lead to infinite horizon stochastic programs that offer signific...
One of the major computational tasks of using the traditional cutting plane approach to solve linear...
The paper concerns the study of new classes of nonlinear and nonconvex optimization problems of the ...
International audienceWe focus on convex semi-infinite programs with an infinite number of quadratic...
The long term may be difficult to define. In the computer industry, looking months ahead may be far-...
Semi-infinite programs will be solved by bisections within the framework of LPs. No gradient informa...
We focus on convex semi-infinite programs with an infinite number of quadratically parametrized cons...
We solve a class of convex infinite-dimensional optimization problems using a numerical approximatio...
We study a class of countably-infinite-dimensional linear programs (CILPs) whose feasible sets are b...
We present necessary and sufficient conditions for discrete infinite horizon optimization problems w...
http://deepblue.lib.umich.edu/bitstream/2027.42/7451/5/bbl2253.0001.001.pdfhttp://deepblue.lib.umich...
We consider a general doubly-infinite, positive-definite, quadratic programming problem. We show tha...
AbstractThe paper starts with a simple model and convergence theorem for outer approximation methods...
We propose an approach to find the optimal value of a convex semi-infinite program (SIP) that involv...
. Dynamic optimization problems, including optimal control problems, have typically relied on the so...
Models for long-term planning often lead to infinite horizon stochastic programs that offer signific...
One of the major computational tasks of using the traditional cutting plane approach to solve linear...
The paper concerns the study of new classes of nonlinear and nonconvex optimization problems of the ...
International audienceWe focus on convex semi-infinite programs with an infinite number of quadratic...
The long term may be difficult to define. In the computer industry, looking months ahead may be far-...
Semi-infinite programs will be solved by bisections within the framework of LPs. No gradient informa...
We focus on convex semi-infinite programs with an infinite number of quadratically parametrized cons...
We solve a class of convex infinite-dimensional optimization problems using a numerical approximatio...
We study a class of countably-infinite-dimensional linear programs (CILPs) whose feasible sets are b...
We present necessary and sufficient conditions for discrete infinite horizon optimization problems w...
http://deepblue.lib.umich.edu/bitstream/2027.42/7451/5/bbl2253.0001.001.pdfhttp://deepblue.lib.umich...
We consider a general doubly-infinite, positive-definite, quadratic programming problem. We show tha...
AbstractThe paper starts with a simple model and convergence theorem for outer approximation methods...
We propose an approach to find the optimal value of a convex semi-infinite program (SIP) that involv...
. Dynamic optimization problems, including optimal control problems, have typically relied on the so...
Models for long-term planning often lead to infinite horizon stochastic programs that offer signific...
One of the major computational tasks of using the traditional cutting plane approach to solve linear...
The paper concerns the study of new classes of nonlinear and nonconvex optimization problems of the ...