Global optimality under amenable symmetry constraints | allainews.com

Feb. 13, 2024, 5:44 a.m. | Peter Orbanz

cs.LG updates on arXiv.org arxiv.org

We ask whether there exists a function or measure that (1) minimizes a given convex functional or risk and (2) satisfies a symmetry property specified by an amenable group of transformations. Examples of such symmetry properties are invariance, equivariance, or quasi-invariance. Our results draw on old ideas of Stein and Le Cam and on approximate group averages that appear in ergodic theorems for amenable groups. A class of convex sets known as orbitopes in convex analysis emerges as crucial, and …

constraints cs.lg examples function functional global ideas math.st property risk stat.ml stat.th symmetry

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