Geometric spectral theory for Kähler functions

Abstract: We consider K\"ahler toric manifolds $N$ that are torifications of statistical manifolds $\mathcal{E}$ in the sense of [M. Molitor, "K\"ahler toric manifolds from dually flat spaces", arXiv:2109.04839], and prove a geometric analogue of the spectral decomposition theorem in which Hermitian matrices are replaced by K\"ahler functions on $N$. The notion of "spectrum" of a K\"ahler function is defined, and examples are presented. This paper is motivated by the geometrization program of Quantum Mechanics that we pursued in previous works (see, e.g., [M. Molitor, "Exponential families, K\"ahler geometry and quantum mechanics", J. Geom. Phys. 70, 54-80 (2013)]).