A Pointwise Inequality for Derivatives of Solutions of the Heat Equation in Bounded Domains

Abstract

Let u(t,x) be a solution of the heat equation in Rn. Then, each k-th derivative also solves the heat equation and satisfies a maximum principle, the largest k-th derivative of u(t,x) cannot be larger than the largest k-th derivative of u(0,x). We prove an analogous statement for the solution of the heat equation on bounded domains ⊂ Rn with Dirichlet boundary conditions. As an application, we give a new and fairly elementary proof of the sharp growth of the second derivatives of Laplacian eigenfunction - φk = λk φk with Dirichlet conditions on smooth domains ⊂ Rn.