摘要
Mathematical programming problems with semi-continuous variables and cardinality constraint have many applications,including production planning,portfolio selection,compressed sensing and subset selection in regression.This class of problems can be modeled as mixed-integer programs with special structures and are in general NP-hard.In the past few years,based on new reformulations,approximation and relaxation techniques,promising exact and approximate methods have been developed.We survey in this paper these recent developments for this challenging class of mathematical programming problems.
基金
supported by the National Natural Science Foundation of China grants(Nos.11101092,10971034)
the Joint National Natural Science Foundation of China/Research Grants Council of Hong Kong grant(No.71061160506)
the Research Grants Council of Hong Kong grants(Nos.CUHK414808 and CUHK414610).
