A potpourri of algebraic properties of the ring of periodic distributions
Sasane, A.
(2018).
A potpourri of algebraic properties of the ring of periodic distributions.
Bulletin of the Belgian Mathematical Society,
25(5), 755-776.
(2018).
A potpourri of algebraic properties of the ring of periodic distributions.
Bulletin of the Belgian Mathematical Society,
25(5), 755-776.
The set of periodic distributions, with usual addition and convolution, forms a ring, which is isomorphic, via taking a Fourier seriesexpansion, to the ring S′(Zd) of sequences of at most polynomial growth with termwise operations. In this article, we establish several algebraic properties of these rings.