Progress in Mathematical Physics Volume 34 Editors-in-Chief Anne Boutet de Monvel, Universite Paris VII Denis Diderot Gerald Kaiser, The Virginia Center for Signals and Waves Editorial Board D. Bao, University of Houston C. Berenstein, University ofM aryland, College Park P. Blanchard, Universitat Bielefeld A.S. Fokas, Imperial College of Science, Technology and Medicine C. Tracy, University of California, Davis H. van den Berg, Wageningen University Clifford Algebras Applications to Mathematics, Physics, and Engineering Rafal Ablamowicz Editor Birkhtiuser Boston • Basel· Berlin Rafal Ablamowicz Department of Mathematics, Box 5054 Tennessee Technological University Cookeville. TN 38505 U.s.A. rablamoyicz~tntech.edu http://www.math.tntech.eduirafaV Library of Congress Cataloging-In-Publication Data A CIP ~atalogue record for this book is available from the Library of Congress, Washinglon D.C., USA. AMS SubjcclClassifications: Primary: 30035. ISA66, ISA69, I SA7S. 53C27, 5SB32. 5SB34,6SUIO, SI R2S, SIRSO; S«,ondary: 05EIO. 05EIS, IIESl, I lESS, IIF03, 11F41, 13ElO, 14D21, 15·04, ISA33, 16W30, 16WSO, I1A3S, 17B, 17B10. I1B3S, 17B37. I1B4S, 19D5S, 2OC0S,2OC30,2OGIS,2OO42,22E2S,3OG25, 31CI2, 31C20, 32A36, 32A4O, 32A50, 32W05, 35F15, 35HlO, 35K15, 35040. 35S0S, 42B30, 42835, 43ASO. 46H30. 46LS7, 47A13, 47A60, 51N2S, 53A30, 53820, 53C07, S3C15. S3(2S, 53C30, 53C50. 5SC35, SSJ4O,58J60, 65D17,65KOS,65M60, 65RlO, 78A45, 78A46, 81PIS, 81Q05, 8ITIO, 81T13, 81nS, 81 V22, 83AOS, 83COS, 83(40, 8307, 83C6O ISBN-13: 978-1-4612-7393-6 c-1SBN·13: 918-1-4612-2044-2 DOl: 10.1007/918-1-4612-2044-2 a»" 02004 Birkhltuser Boston Birkhiiuser lLIJl.l Soflcovcr reprint of the hardcover in lSI edition 2004 All rights reserved. This work may 1101 be translated or copied in whole or in pan withoulthe written permission of the publisher (BirkMuser Boslon, c/o Springer-Verlag New York, Inc., 175 Fifth Avenue, New York, NY 10010, USA), c;I(cept for brief C;l(cerpts in connection with reviews or scholarly analysis. Use in conneclion with any form of information storage and retrieval, electronic adaptatioo, compuler software, or by similar or dissimilar methodology now known or hereafter developed is forbidden. The use in this publication of trade names, trademarks, service marks and similar tenns, even if they are not identified as such, is not to be taken as an expressinn of opinion as to whether or 001 they are subject to propeny rights. Typeset by !be editor in AMS-IH&X. 9 8 7 6 S 4 3 2 I SPIN 10955864 BirWuser is pan of Springer Science+Business Media www.birkhauser.com Contents PREFACE Rafal Ablamowicz ...................................................... IX PART I. CLIFFORD ANALYSIS ......................................... 1 1. The Morera Problem in Clifford Algebras and the Heisenberg Group Carlos A. Berenstein, Der-Chen Chang, and Wayne M. Eby .................. 3 2. Multidimensional Inverse Scattering Associated with the SchrOdinger Equation Swanhild Bernstein ..................................................... 23 3. On Discrete Stokes and Navier-Stokes Equations in the Plane Klaus Giirlebeck and Angela Hommel .................................... 35 4. A Symmetric Functional Calculus for Systems of Operators of Type w Brian Jefferies .......................................................... 59 5. Poincare Series in Clifford Analysis Rolf Soren Krausshar ................................................... 75 6. Harmonic Analysis for General First Order Differential Operators in Lipschitz Domains Emilio Marmolejo-Olea and Marius Mitrea ............................... 91 7. Paley-Wiener Theorems and Shannon Sampling in the Clifford Analysis Setting Tao Qian ............................................................. 115 8. Bergman Projection in Clifford Analysis Guangbin Ren and Helmuth R. Malonek ................................. 125 9. Quaternionic Calculus for a Class of Initial Boundary Value Problems Wolfgang Sprossig ........................ '" .......................... 141 vi Contents PART II. GEOMETRY ................................................ 153 lO. A Nahm Transform for Instantons over ALE Spaces Claudio Bartocci and Marcos Jardim .................................... 155 11. Hyper-Hermitian Manifolds and Connections with Skew-Symmetric Torsion Gueo Grantcharov ..................................................... 167 12. Casimir Elements and Bochner Identities on Riemannian Manifolds Yasushi Homma ....................................................... 185 13. Eigenvalues of Dirac and Rarita-Schwinger Operators Doojin Hong .......................................................... 201 14. Differential Forms Canonically Associated to Even-Dimensional Compact Conformal Manifolds William J. Ugalde ..................................................... 211 15. The Interface of Noncommutative Geometry and Physics Joseph C. Vdrilly ...................................................... 227 PART III. MATHEMATICAL STRUCTURES ........................... 243 16. The Method of Virtual Variables and Representations of Lie Superalgebras Andrea Brini, Francesco Regonati, and Antonio Teolis .................... 245 17. Algebras Like Clifford Algebras Michael Eastwood ..................................................... 265 18. Grade Free Product Formula: from Grassmann-Hopf Gebras Bertfried Fauser ....................................................... 279 19. The Clifford Algebra in the Theory of Algebras, Quadratic Forms, and Classical Groups Alexander Hahn ....................................................... 305 20. Lipschitz's Methods of 1886 Applied to Symplectic Clifford Algebras Jacques Helmstetter ................................................... 323 Contents vii 21. The Group of Classes ofInvolutions of Graded Central Simple Algebras Jacques Helmstetter ................................................... 335 22. A Binary Index Notation for Clifford Algebras Dennis W. Marks ...................................................... 343 23. Transposition in Clifford Algebra: SU (3) from Reorientation Invariance Bernd Schmeikal ...................................................... 351 PART IV. PHYSICS ................................................... 373 24. The QuantumlClassical Interface: Insights from Clifford's (Geometric) Algebra William E. Baylis ...................................................... 375 25. Standard Quantum Spheres Francesco Bonechi, Nicola Ciccoli, and Marco Tarlini .................... 393 26. Clifford Algebras, Pure Spinors and the Physics of Fermions Paolo Budinich ........................................................ 401 27. Spinor Formulations for Gravitational Energy-Momentum Chiang-Mei Chen, James M. Nester, and Roh-Suan Tung .................. 417 28. Chiral Dirac Equations Claude Daviau ........................................................ 431 29. Using Octonions to Describe Fundamental Particles Tevian Dray and Corinne A. Manogue ................................... 451 30. Applications of Geometric Algebra in Electromagnetism, Quantum Theory and Gravity Anthony Lasenby, Chris Doran, and Elsa A rca ute ......................... 467 31. Noncommutative Physics on Lie Algebras, (Z2t Lattices and Clifford Algebras Shahn Majid .......................................................... 491 32. Dirac Operator on Quantum Homogeneous Spaces and Noncommutative Geometry Robert M. Owe zarek ................................................... 519 viii Contents 33. r-Fold Multivectors and Superenergy Jose M. Pozo and Josep M. Parra ....................................... 531 34. The CC Approach to the Standard Model 7 Greg Trayling and William E. Baylis ..................................... 547 PART V. APPLICATIONS IN ENGINEERING .......................... 559 35. Implementation of a Clifford Algebra Co-Processor Design on a Field Programmable Gate Array Christian Perwass, Christian Gebken, and Gerald Sommer ................ 561 36. Image Space Jan 1. Koenderink ..................................................... 577 37. Pose Estimation of Cycloidal Curves by using Twist Representations Bodo Rosenhahn and Gerald Sommer ................................... 597 INDEX .............................................................. 613 Preface This volume contains a selection of invited papers, often in expanded form, that are based on presentations made at the 6th Conference on Clifford Algebras and their Applications in Mathematical Physics, May 20-25, 2002, in Cookeville, Tennessee [1]. The organizers of the conference, Rafal Ablamowicz (Tennessee Technological University), and John Ryan (University of Arkansas) grouped all conference presentations into five sessions in Clifford analysis, geometry, mathe matical structures, physics, and applications in engineering. Thus it seemed natu ral to organize the book into five parts under the same titles. The 6th Conference on Clifford Algebras continued a 16-year sequence of in ternational conferences devoted to the mathematical aspects of Clifford algebras and their varied applications in mathematical physics, and, more recently, in cy bernetics, robotics, image processing and engineering. Previous meetings took place at the University of Kent, Canterbury, U.K., 1985; University of Montpel lier, Montpellier, France, 1989; University of Gent, Gent, Belgium, 1993; Univer sity of Aachen, Germany, 1996; and Ixtapa, Mexico, 1999. Three edited volumes appeared after the Ixtapa conference, published by Birkhauser, Boston [2--4]. Chapter I, in this volume, is devoted exclusively to topics from Clifford anal ysis and range from the Morera problem, inverse scattering associated with the SchrOdinger equation, through discrete Stokes equations in the plane, a symmetric functional calculus, Poincare series, to differential operators in Lipschitz domains, Paley-Wiener theorems and Shannon sampling, Bergman projections, and quater nionic calculus for a class of boundary value problems. Among geometry topics, not so visibly present at previous conferences that gave rise to Chapter 2, are spin structures and Clifford bundles, eigenvalue problems for Dirac and Rarita Schwinger operators, differential forms on conformal manifolds, connection and torsion, Bochner identities on Riemannian manifolds, and noncom mutative ge ometry in physics. Chapter 3 is devoted to mathematical structures such as Grass mann algebras, Lie superalgebras, Grassmann-Hopf algebras, symplectic Clifford algebras and graded central algebras. Applications in physics, collected in Chap ter 4, cover a wide range of topics from classical mechanics to general relativity, twistor and octonionic methods, electromagnetism and gravity, elementary parti cle physics, noncommutative physics, Dirac's equation, quantum spheres, and the Standard Model. Chapter 5 includes papers on Clifford geometric algebras and designing co-processors in computer engineering, applications in the description of an image space using Cayley-Klein geometry, and pose estimation. Below the reader will find brief introductions to all chapters in this volume. While the papers collected in this volume require that the reader possess a solid x Preface knowledge of appropriate background material, as they lead to the most current research topics, the fundamentals of this background were presented prior to the 6th Conference in the form of six lectures. The lectures were delivered by promi nent specialists in the field (including Pertti Lounesto to whom this volume is dedicated). They were aimed at graduate students and newcomers to the field. These lectures will appear in a separate volume from Birkhauser in 2003 [6]. Papers from regular sessions at the 6th Conference included here were selected by the conference session organizers who oversaw the refereeing process: o Clifford Analysis: Marius Mitrea (University of Missouri-Columbia, Co lumbia, Missouri), and Mircea Martin (Baker University, Baldwin City, Kansas); o Geometry: Tom Branson (University of Iowa, Iowa City, Iowa), and Ugo Bruzzo (International School for Advanced Studies, Trieste, Italy); o Mathematical Structures: Ludwik Dabrowski (SISSA, Trieste, Italy), and Bertfried Fauser (Universitat Konstanz, Konstanz, Germany); o Physics: William Baylis (University of Windsor, Windsor, Canada), and Giovanni Landi (Universita di Trieste, Trieste, Italy); o Applications: Jon Selig (South Bank University, London, England), and Gerald Sommer (Christian-Albrechts-Universitat Kiel, Kiel, Germany). Papers presented as plenary talks were selected by the Editor. The main aim of this volume, which guided the selection process, was to collect the best papers in each of the five representative areas ranging from pure mathematical theory to a wide array of applications in physics and computer engineering. Following the spirit of the conference, this volume unlike previously published volumes, in cludes a separate chapter on geometry. Dedication I am dedicating this book to the memory of Pertti Lounesto, friend and colleague, whose plenary lecture at the 6th Conference proved to be his last major contribu tion to the field of Clifford algebras - the field he loved so much. PART I. CLIFFORD ANALYSIS Berenstein, Chang and Eby: In this paper the authors discuss the Morera prob lem for functions f taking values in a Clifford algebra Cin. As a replacement for the Morera theorem from the complex plane C, which gives necessary and sufficient conditions for a continuous function f in an open subset n of C to be n, holomorphic in they formulate integral conditions whose vanishing on a Lip schitz boundary of every bounded domain secures that f be left regular. They establish a connection, similar to the one from the Euclidean space, between the
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