Lower bounds on Lp quasi-norms and the Uniform Sublevel Set Problem

Abstract

Recently, Steinerberger proved a uniform inequality for the Laplacian serving as a counterpoint to the standard uniform sublevel set inequality which is known to fail for the Laplacian. In this paper, we observe that many inequalities of this type follow from a uniform lower bound on the L1 norm, and give an analogous result for any linear differential operator, which can fail for non-linear operators. We consider lower bounds on the Lp quasi-norms for p<1 as a stronger property that remains weaker than a uniform sublevel set inequality and prove this for the Laplacian and heat operators. We conclude with some naturally arising questions.