Resource allocation problems with expensive function evaluations
研究在凸和非凸可分离成本函数下,如何用有限次函数评估求解整数资源分配问题,提出启发式和精确方法,并在放射治疗规划实例中验证优于现有无导数优化求解器。
The resource allocation problem is among the classical problems in operations research, and has been studied extensively for decades. However, current solution approaches are not able to efficiently handle problems with expensive function evaluations, which can occur in a variety of applications. We study the integer resource allocation problem with expensive function evaluations, for both convex and non-convex separable cost functions. We present several solution methods, both heuristics and exact methods, that aim to limit the number of function evaluations. The methods are compared in numerical experiments using both randomly generated instances and instances from two resource allocation problems occurring in radiation therapy planning. Results show that the presented solution methods compare favorably against existing derivative free optimization solvers.