On the impossibility of the convolution of distributions

Ghislain R. Franssens ghislain.franssens@aeronomy.be

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https://doi.org/10.4067/S0719-06462013000200007

Abstract

Certain incompatibilities are proved related to the prolongation of an associative derivation convolution algebra, defined for a subset of distributions, to a larger subset of distributions containing a derivation and the one distribution. This result is a twin of Schwartz‘ impossibility theorem, stating certain incompatibilities related to the prolongation of the multiplication product from the set of continuous functions to a larger subset of distributions containing a derivation and the delta distribution. The presented result shows that the non-associativity of a recently constructed derivation convolution algebra of associated homogeneous distributions with support in R cannot be avoided.

Keywords

Generalized function , Distribution , Convolution algebra , Impossibility theorem

Ghislain R. Franssens Belgian Institute for Space Aeronomy, Ringlaan 3, B-1180 Brussels, Belgium.

Pages: 71–77
Date Published: 2013-06-01
Vol. 15 No. 2 (2013): CUBO, A Mathematical Journal

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Published

2013-06-01

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G. R. Franssens, “On the impossibility of the convolution of distributions”, CUBO, vol. 15, no. 2, pp. 71–77, Jun. 2013.

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Vol. 15 No. 2 (2013): CUBO, A Mathematical Journal

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Articles

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