The Snapshot Problem for the Euler-Poisson-Darboux Equation

Abstract

The generalized Euler-Poisson-Darboux (EPD) equation with complex parameter α is given by x u=∂2 u∂ t2+n-1+2αt\,∂ u∂ t, where u(x,t)∈ E( Rn× R), with u even in t. For α=0 and α=1 the solution u(x,t) represents a mean value over spheres and balls, respectively, of radius |t| in Rn. In this paper we consider existence and uniqueness results for the following two-snapshot problem: for fixed positive real numbers r and s and smooth functions f and g on Rn, what are the conditions under which there is a solution u(x,t) to the generalized EPD equation such that u(x,r)=f(x) and u(x,s)=g(x)? The answer leads to a discovery of Liouville-like numbers related to Bessel functions, and we also study the properties of such numbers.