Computing Kurdyka-ojasiewicz exponents via composition and symmetry
Abstract
We devise calculus rules for the Kurdyka-ojasiewicz exponent using the rank theorem and Lie group actions. They apply to a wide class of composite and invariant functions, and are particularly suitable for handling nonisolated local minima. Notably, smoothness plays no role, eschewing gradient and Hessian computations. This provides a unified framework for establishing linear convergence of various algorithms in matrix factorization, 1-matrix factorization, matrix sensing, and linear neural networks.
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