Fischer decompositions for entire functions and the Dirichlet problem for parabolas

Abstract

Let P2k be a homogeneous polynomial of degree 2k and assume that there exist C>0, D>0 and α 0 such that equation* P2kfm,fmL2(Sd-1)≥ 1C( m+D) α fm,fmSd-1 equation* for all homogeneous polynomials fm of degree m. Assume that Pj for j=0, … ,β <2k are homogeneous polynomials of degree j. The main result of the paper states that for any entire function f of order % <( 2k-β ) /α there exist entire functions q and h of order bounded by such that equation* f=( P2k-Pβ - … -P0) q+h and hr=0. equation* This result is used to establish the existence of entire harmonic solutions of the Dirichlet problem for parabola-shaped domains on the plane, with data given by entire functions of order smaller than 12.