Operators of solution for convolution equations

Authors

  • J. Bonet
  • C. Fernandez
  • R. Meise

DOI:

https://doi.org/10.1285/i15900932v17p1

Keywords:

Spaces of ultradifferentiable functions, Convolution operators, Continuous linear right inverse

Abstract

We prove that the existence of a solution operator for a convolution operator from the space of ultradifferntiable functions to the corresponding space of ultradistributions is equivalent to the existence of a continuous solution operator in the space of functions. Our results are in the spirit of a classical characterization of the surjectivity of convolution operators due to Hörmander. The behaviour of a fixed convolution operator in different classes of ultradifferentiable functions of Beurling type concerning the existence of a continuous linear right inverse is also considered.

Downloads

Published

01-01-1997

Issue

Volume 17 (1997)

Section

Articoli

License

Authors who publish with this publication accept all the terms and conditions of the Creative Commons license at the link below.

Gli autori che pubblicano in questa rivista accettano i termini e le condizioni specificate nella licenza Creative Commons di cui al link sottostante.

http://creativecommons.org/licenses/by-nc-nd/3.0/it/legalcode