Structural properties of affine sparsity constraints
成果类型:
Article; Proceedings Paper
署名作者:
Dong, Hongbo; Ahn, Miju; Pang, Jong-Shi
署名单位:
Washington State University; University of Southern California
刊物名称:
MATHEMATICAL PROGRAMMING
ISSN/ISSBN:
0025-5610
DOI:
10.1007/s10107-018-1283-3
发表日期:
2019
页码:
95-135
关键词:
mathematical programs
variable selection
regularization
relaxation
scheme
FAMILY
Lasso
摘要:
We introduce a new constraint system for sparse variable selection in statistical learning. Such a system arises when there are logical conditions on the sparsity of certain unknown model parameters that need to be incorporated into their selection process. Formally, extending a cardinality constraint, an affine sparsity constraint (ASC) is defined by a linear inequality with two sets of variables: one set of continuous variables and the other set represented by their nonzero patterns. This paper aims to study an ASC system consisting of finitely many affine sparsity constraints. We investigate a number of fundamental structural properties of the solution set of such a non-standard system of inequalities, including its closedness and the description of its closure, continuous approximations and their set convergence, and characterizations of its tangent cones for use in optimization. Based on the obtained structural properties of an ASC system, we investigate the convergence of B(ouligand) stationary solutions when the ASC is approximated by surrogates of the step 0-function commonly employed in sparsity representation. Our study lays a solid mathematical foundation for solving optimization problems involving these affine sparsity constraints through their continuous approximations.
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