Nonlinear Rayleigh quotient optimization

Abstract

Rayleigh quotient minimization deals with optimizing a quadratic homogeneous function over a sphere. Its critical points correspond to the normalized eigenvectors of the symmetric matrix associated with the quadratic form. In this paper, we consider a homogeneous polynomial objective function f over a sphere, a projective algebraic variety X, and we study the X-eigenpoints of f, which are classes of critical points of f constrained to the sphere and the affine cone over X. The number of X-eigenpoints of a generic polynomial f is the Rayleigh-Ritz degree of X. This invariant is a version of the Euclidean distance degree of a Veronese embedding of X. We provide concrete formulas in various scenarios, including those involving varieties of rank-one tensors.

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