Analytic Solutions of the Heat Equation

Abstract

Motivated by the recent proof of Newman's conjecture R-T we study certain properties of entire caloric functions, namely solutions of the heat equation ∂t F = ∂z2 F which are entire in z and t. As a prerequisite, we establish some general properties of the order and type of an entire function. Then, we start our inquiry on entire caloric functions by determining the necessary and sufficient condition for a function f(z) to be the initial condition of an entire solutions of the heat equation and, subsequently, we examine the relation of the z-order and z-type of an entire caloric function F(t, z), viewed as function of z, to its t-order and t-type respectively, if it is viewed as function of t. After that, we shift our attention to the zeros zk(t) of an entire caloric function F(t, z), viewed as function of z. We show that the points (t, z) at which F(t, z) = ∂z F(t, z) = 0 form a discrete set in C2 and we derive the t-evolution equations of the zeros of F(t, z). These are differential equations which hold for all but countably many t ∈ C.