Ultradistributions on R+n. Solvability and hypoellipticity through series expansions of ultradistributions

Abstract

In the first part we analyze space G*( Rn+) and its dual through Laguerre expansions when these spaces correspond to a general sequence \Mp\p∈ N0, where * is a common notation for the Beurling and Roumieu cases of spaces. In the second part we are solving equation of the form Lu=f,\; L=Σj=1kajAjhj+cEdy+bP(x,Dx), where f belongs to the tensor product of ultradistribution spaces over compact manifolds without boundaries as well as ultradistribution spaces on Rn+ and Rm; Aj, j=1,...,k, Ey and P(x,Dx) are operators whose eigenfunctions form orthonormal basis of corresponding L2-space. The sequence space representation of solutions enable us to study the solvability and the hypoellipticity in the specified spaces of ultradistributions.