A Fr\'echet Lie group on distributions

Abstract

Solving non-autonomous systems of ordinary differential equations leads to consider a new product of bivariate distributions called the ~product in the literature. This product, distinct from the convolution product, has recently been used to establish structural results concerning non-autonomous differential systems, yet its formal underpinnings remain unclear. We demonstrate that it is well-defined on the weak closure of the space of smooth functions on a compact subset of R2. We establish that a subset of this weak closure has the structure of a Fr\'echet space D. The ~product arises from the composition of endomorphisms of that space. Invertible elements of D form a dense subset of it and a Fr\'echet Lie group for the operation . This product generalizes the convolution, Volterra compositions of first and second type and induces Schwartz's bracket.