Abstract
The space of tempered distributions 𝒮′ can be realized as a sequence spaces by means of the Hermite representation theorem. In this article, we introduce and study two new products of tempered distributions based on this Hermite representation theorem. In particular, we obtain the products [H]δ=δ/2, [δ] vp(1/x)=−δ′ and [δ(r)]vp(1/x)=−(δ(r+1))/(r+1) for even r.
Acknowledgements
P. Catuogno is partially supported by FAPESP 02/10246-2 and S. Molina is partially supported by UNMDP.