An existence and uniqueness result about algebras of Schwartz distributions

Abstract

We prove that there exists essentially one minimal differential algebra of distributions , satisfying all the properties stated in the Schwartz impossibility result [L. Schwartz, Sur l'impossibilit\'e de la multiplication des distributions, 1954], and such that p∞ ⊂eq ⊂eq ' (where p∞ is the set of piecewise smooth functions and ' is the set of Schwartz distributions over ). This algebra is endowed with a multiplicative product of distributions, which is a generalization of the product defined in [N.C.Dias, J.N.Prata, A multiplicative product of distributions and a class of ordinary differential equations with distributional coefficients, 2009]. If the algebra is not minimal, but satisfies the previous conditions, is closed under anti-differentiation and the dual product by smooth functions, and the distributional product is continuous at zero then it is necessarily an extension of .