Topological Algebra and its Applications (Jul 2020)
An analogue of Serreβs conjecture for a ring of distributions
Abstract
The set π := πΊΞ΄0+ π+β², obtained by attaching the identity Ξ΄0 to the set π+β² of all distributions on π with support contained in (0, β), forms an algebra with the operations of addition, convolution, multiplication by complex scalars. It is shown that π is a Hermite ring, that is, every finitely generated stably free π-module is free, or equivalently, every tall left-invertible matrix with entries from π can be completed to a square matrix with entries from π, which is invertible.
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