Closure properties of solutions to heat inequalities

Abstract

We prove that if u1,u2 : (0,∞) × d (0,∞) are sufficiently well-behaved solutions to certain heat inequalities on d then the function u: (0,∞) × d (0,∞) given by u1/p=u11/p1 * u21/p2 also satisfies a heat inequality of a similar type provided 1p1 + 1p2 = 1 + 1p. On iterating, this result leads to an analogous statement concerning n-fold convolutions. As a corollary, we give a direct heat-flow proof of the sharp n-fold Young convolution inequality and its reverse form.