An extension of harmonic functions along fixed direction

Abstract

Let a function u(x,y) be harmonic in the domain D× Vr=D× \y∈ Rm: |y|<r\⊂ Rn× Rm and for each fixed point x0 from some a set E⊂ D, %which is not embedded in countable association of N-sets of Lh0(D), the function u(x0,y), as a function of variable y, can be extended to a harmonic function on the whole Rm. Then u(x,y) harmonically extends to the domain D× Rm as a function of variables x and y.