A new notion of subharmonicity on locally smoothing spaces, and a conjecture by Braverman, Milatovic, Shubin

Abstract

Given a strongly local Dirichlet space and λ≥ 0, we introduce a new notion of λ--subharmonicity for L1--functions, which we call local λ--shift defectivity, and which turns out to be equivalent to distributional λ--subharmonicity in the Riemannian case. We study the regularity of these functions on a new class of strongly local Dirichlet, so called locally smoothing spaces, which includes Riemannian manifolds (without any curvature assumptions), finite dimensional RCD spaces, Carnot groups, and Sierpinski gaskets. As a byproduct of this regularity theory, we obtain in this general framework a proof of a conjecture by Braverman, Milatovic, Shubin on the positivity of distributional Lq-solutions of f≤ f for complete Riemannian manifolds.