Albert Crumeyrolle
Albert Crumeyrolle | |
---|---|
Born | 1919 |
Died | June 17, 1992[1] |
Nationality | French |
Fields | Mathematics |
Academic advisors | André Lichnerowicz |
Known for | major contributions to the study of Clifford algebras, in particular spinor structures and symplectic Clifford algebra |
Albert J. Crumeyrolle (1919–1992) was a French mathematician and professor of mathematics at the Paul Sabatier University, known for his contributions to spinor structures and Clifford algebra.
Work
Crumeyrolle was a student of André Lichnerowicz under whose supervision he completed a thesis in 1961.[2]
His first important paper after completing his doctorate addressed spinor structures using methods of Clifford algebras developed by Claude Chevalley.[3]
Crumeyrolle is known for his major contributions to theories of Clifford algebras and spinor structures. In 1975 he laid the foundations for symplectic Clifford algebra and the symplectic spinor.[4] An earlier publication by two other authors, Nouazé and Revoy, had appeared three years before in which Weyl algebras were treated from a Cliffordian point of view. Crumeyrolle however drew more attention to the topic, and, as emphasized by Jacques Helmstetter, he contributed original ideas of his own.[5] His work on symplectic Clifford algebras however came under serious critique on mathematical grounds.[6]
The mathematician Artibano Micali recalled Crumeyrolle stating that periodicity of Clifford algebras should play a similar role for elementary particle physics as the periodic classification of elements by Dmitri Mendeleev has played for the periodic table of elements.[3]
Crumeyrolle taught in Iran in 1966, in several Europe countries and, in 1973, at Stanford University summer school.[2]
Publications
Books
- Orthogonal and symplectic Clifford algebras: Spinor Structures, 1990
- Albert Crumeyrolle, J. Grifone: Symplectic geometry, Pitman Advanced Publishing Program, 1983
- Algèbres de Clifford et spineurs, 1974
- Bases géométriques de la topologie algébrique, 1970
- Compléments d'algèbre moderne, 1969
- Notions fondamentales d'algèbre moderne, 1967
Further reading
- Rafał Abłamowicz, Pertti Lounesto (eds.): Clifford algebras and spinor structures: a special volume dedicated to the memory of Albert Crumeyrolle (1919–1992), Kluwer Academic Publishers, 1995, ISBN 0-7923-3366-7
- Z. Ozievicz, Cz. Sitarczyk: Parallel treatment of Riemannian and symplectic Clifford algebras. In: A. Micali, R. Boudet, J. Helmstetter (eds.): Clifford Algebras and their Applications in Mathematical Physics: Workshop Proceedings: 2nd (Fundamental Theories of Physics), Kluwer Academic Publishers, 1992, ISBN 978-0-7923-1623-7, p. 83–96
References
- ↑ Rafał Abłamowicz, Pertti Lounesto (eds.): Clifford Algebras and Spinor Structures: A Special Volume Dedicated to the Memory of Albert Crumeyrolle (1919–1992), Kluwer Academic Publishers, 1995, ISBN 0-7923-3366-7, Preface, p. viii
- 1 2 Albert J. Crumeyrolle, www.gravityresearchfoundation.org
- 1 2 Artibano Micali: Albert Crumeyrolle: la démarche algébrique d'un géomètre. In: Pertti Lounesto, Rafał Abłamowicz (ed.): Clifford Algebras and Spinor Structures: A Special Volume Dedicated to the Memory of Albert Crumeyrolle (1919--1992), Springer Netherlands, 1995, ISBN 0-7923-3366-7, p. ix–xiv (in French language)
- ↑ Zbigniew Oziewicz, Bernard Jancewicz, Andrzej Borowiec (eds.): Spinors, Twistors and Clifford Algebras and Quantum Deformations: Proceedings of the II Max Born Symposium Held Near Wroclaw, Poland, September 1992 (Fundamental Theories of Physics), Springer, 1993, p. xv
- ↑ Publication by Nouazé and Revoy, cited by: Jacques Helmstetter: Lipschitz' methods of 1886 applied to symplectic Clifford algebras. In: Pertti Lounesto, Rafał Abłamowicz (ed.): Clifford Algebras: Applications to Mathematics, Physics, and Engineering, Birkhäuser, 2004, ISBN 978-0-8176-3525-1, pp. 323–334, therein p. 332
- ↑ Jacques Helmstetter: Lipschitz' methods of 1886 applied to symplectic Clifford algebras. In: Pertti Lounesto, Rafał Abłamowicz (ed.): Clifford Algebras: Applications to Mathematics, Physics, and Engineering, Birkhäuser, 2004, ISBN 978-0-8176-3525-1, pp. 323–334, therein p. 333