Optimization of random high-dimensional functions: Structure and algorithms
Abstract
Replica symmetry breaking postulates that near optima of spin glass Hamiltonians have an ultrametric structure. Namely, near optima can be associated to leaves of a tree, and the Euclidean distance between them corresponds to the distance along this tree. We survey recent progress towards a rigorous proof of this picture in the context of mixed -spin spin glass models. We focus in particular on the following topics: ~The structure of critical points of the Hamiltonian; ~The realization of the ultrametric tree as near optima of a suitable TAP free energy; ~The construction of efficient optimization algorithm that exploits this picture.
Cite
@article{arxiv.2206.10217,
title = {Optimization of random high-dimensional functions: Structure and algorithms},
author = {Antonio Auffinger and Andrea Montanari and Eliran Subag},
journal= {arXiv preprint arXiv:2206.10217},
year = {2022}
}
Comments
21 pages. To appear as a contribution to the edited volume "Spin Glass Theory & Far Beyond - Replica Symmetry Breaking after 40 Years", World Scientific