The log-Sobolev inequality for the ground state of a Schr\"odinger operator on bounded convex domains

Abstract

We consider the ground state φ0 of the Schr\"odinger operator L=-+V on the bounded convex domain ⊂n, satisfying the Dirichlet boundary condition. Assume that V∈ C1() and it admits an even function V∈ C1([-D/2,D/2]) as its modulus of convexity, where D is the diameter of . If the first Dirichlet eigenvalue λ0 of -2 t2+ V on the interval [-D/2,D/2] satisfies λ0> V(0), then the measure μ=φ0 x satisfies the log-Sobolev inequality on with the constant λ0- V(0). In particular, if V is convex, then the constant is explicitly given by π2D2.