Nonlinear Generalized Functions: their origin, some developments and recent advances

Abstract

We expose some simple facts at the interplay between mathematics and the real world, putting in evidence mathematical objects ” nonlinear generalized functions” that are needed to model the real world, which appear to have been generally neglected up to now by mathematicians. Then we describe how a ”nonlinear theory of generalized functions” was obtained inside the Leopoldo Nachbin group of infinite dimensional holomorphy between 1980 and 1985 **. This new theory permits to multiply arbitrary distributions and contains the above mathematical objects, which shows that the features of this theory are natural and unavoidable for a mathematical description of the real world. Finally we present direct applications of the theory such as existence-uniqueness for systems of PDEs without classical solutions and calculations of shock waves for systems in non-divergence form done between 1985 and 1995 ***, for which we give three examples of different nature (elasticity, cosmology, multifluid flows).