The Complexity of Continuous Optimization

• dc.contributor.author: Rogaway, Phillip
• dc.date.issued: 1991-06
• dc.identifier.uri: https://hdl.handle.net/1721.1/149179
• dc.description.abstract: Given a polynomial objective function f(x1,…,xn), we consider the problem of finding the maximum of this polynomial inside some convex set D = {x : Ax <= B}. We show that, under a complexity assumption, this extremum cannot be approximated by any polynomial-time algorithm, even exceedingly poorly. This represents an unusual interplay of discrete and continuous mathematics: using a combinatorial argument to get a hardness result for a continuous optimization problem.
• dc.relation.ispartofseries: MIT-LCS-TM-452
• dc.identifier.oclc: 24101730