A new release of the Quaternion Toolbox for Matlab (QTFM) has been posted on Sourceforge. This release adds significant new functionality, hence the change of the major version number to 3. Continue reading
Modern Applications of Clifford Algebra session (OS-14) at
Joint 11th Int. Conf. on Soft Computing and Intelligent Systems &
21st Int. Symp. on Advanced Intelligent Systems (SCIS&ISIS 2020) Continue reading
SPECIAL ISSUE PAPER, Exponential factorization of multivectors in C l (p ,q ), p +q <3*, by Eckhard Hitzer, First published: 15 July 2020, https://doi.org/10.1002/mma.6629, Preprint: https://www.vixra.org/abs/2004.0408
Abstract: In this paper, we consider general multivector elements of Clifford algebras Cl(p,q), p+q < 3, Continue reading
SCIS&ISIS2020 – Special Session
Modern Applications of Clifford Algebra MACA
Online: 5-8 Dec. 2020
Call for Papers
Paper Submission (I+II, 2-6 pp.) Deadline extended again: 31 July 2020
IMPORTANT: Session now 100% online!!!
Dong Cheng & Kit Ian Kou, Plancherel theorem and quaternion Fourier transform for square integrable functions, Complex Variables and Elliptic Equations, Volume 64, 2019 – Issue 2, DOI: https://doi.org/10.1080/17476933.2018.1427080, Pages 223-242 | Received 29 Mar 2017, Accepted 02 Jan 2018, Published online: 25 Jan 2018.
ABSTRACT: The quaternion Fourier transform (QFT), Continue reading
Eduardo Bayro-Corrochano, Geometric Algebra Applications Vol. II: Robot Modelling and Control, 20. Juni 2020, Springer, Basel, 629 pages, ISBN: 978-3030349769, 137.37 Euro.
Summary: This book presents a unified mathematical treatment of diverse problems in the general domain of robotics and associated fields using Clifford or geometric algebra. By addressing a wide spectrum of problems in a common language, it offers both fresh insights and new solutions that are useful to scientists and engineers working in areas related with robotics. Continue reading
The quaternion-based spatial-coordinate and orientation-frame alignment problems, by Andrew J. Hanson, Luddy School of Informatics, Computing, and Engineering, Indiana University, Bloomington, Indiana, USA, Correspondence e-mail: email@example.com
Edited by S. J. L. Billinge, Columbia University, USA (Received 4 September 2018; accepted 25 February 2020; online 18 June 2020)
Plane-based Geometric Algebra for Computer Science
URL: Download PGA4CS.PDF (745)
PGA is a plane-based geometric algebra which appears eminently suited for the Continue reading
The following three deadlines for the online conference with contributed-, session- and mini symposium papers of
12th International Conference on Clifford Algebras and their Applications 2020 (ICCA12) Continue reading