Quaternionic B-splines

Title: Quaternionic B-splines
Creator: Hogan, Jeffrey A.; Massopust, Peter
Relation: Funding BodyARCGrant NumberDP160101537 http://purl.org/au-research/grants/arc/DP160101537
Relation: Journal of Approximation Theory Vol. 224, p. 43-65
Publisher Link: http://dx.doi.org/10.1016/j.jat.2017.09.003
Publisher: Academic Press
Resource Type: journal article
Date: 2017
Description: We introduce B-splines B_q of quaternionic order q, defined on the real line for the purposes of multi-channel signal analysis. The functions B_q are defined first by their Fourier transforms, then as the solutions of a distributional differential equation of quaternionic order. The equivalence of these definitions requires properties of quaternionic Gamma functions and binomial expansions, both of which we investigate. The relationship between B_q and a backwards difference operator is shown, leading to a recurrence formula. We show that the collection of integer shifts of B_q is a Riesz basis for its span, hence generating a multiresolution analysis. Finally, we demonstrate the pointwise and L^p convergence of the quaternionic B-splines to quaternionic Gaussian functions.
Subject: quaternions; B-splines; Clifford algebra; quaternionic binomial; quaternionic Gamma function; multiresolution analysis
Identifier: http://hdl.handle.net/1959.13/1384436
Identifier: uon:32073
Identifier: ISSN:0021-9045
Language: eng
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