Clifford algebras. Applications to mathematics, physics, and engineering. Papers from the 6th international conference on Clifford algebras and their applications in mathematical physics, Cookeville, TN, USA, May 20--25, 2002 (Q1890172)

The articles of this volume will be reviewed individually. The preceding conference (5, 1999) has been reviewed (see Zbl 0968.00035). Indexed articles: \textit{Berenstein, Carlos A.; Chang, Der-Chen; Eby, Wayne M.}, The Morera problem in Clifford algebras and the Heisenberg group, 3-21 [Zbl 1073.43005] \textit{Bernstein, Swanhild}, Multidimensional inverse scattering associated with the Schrödinger equation, 23-34 [Zbl 1080.30044] \textit{Gürlebeck, Klaus; Hommel, Angela}, On discrete Stokes and Navier-Stokes equations in the plane, 35-58 [Zbl 1075.30022] \textit{Jefferies, Brian}, A symmetric functional calculus for systems of operators of type \(\omega\), 59-74 [Zbl 1084.47013] \textit{Krausshar, Rolf Sören}, Poincaré series in Clifford analysis, 75-89 [Zbl 1071.30048] \textit{Marmolejo-Olea, Emilio; Mitrea, Marius}, Harmonic analysis for general first order differential operators in Lipschitz domains, 91-114 [Zbl 1074.35024] \textit{Qian, Tao}, Paley-Wiener theorems and Shannon sampling in the Clifford analysis setting, 115-124 [Zbl 1103.94012] \textit{Ren, Guangbin; Malonek, Helmuth R.}, Bergman projection in Clifford analysis, 125-139 [Zbl 1065.30052] \textit{Sprössig, Wolfgang}, Quaternionic calculus for a class of initial boundary value problems, 141-151 [Zbl 1071.30054] \textit{Bartocci, Claudio; Jardim, Marcos}, A Nahm transform for instantons over ALE spaces, 155-166 [Zbl 1081.53024] \textit{Grantcharov, Gueo}, Hyper-Hermitian manifolds and connections with skew-symmetric torsion, 167-183 [Zbl 1083.53049] \textit{Homma, Yasushi}, Casimir elements and Bochner identities on Riemannian manifolds, 185-199 [Zbl 1080.53018] \textit{Hong, Doojin}, Eigenvalues of Dirac and Rarita-Schwinger operators, 201-210 [Zbl 1080.53044] \textit{Ugalde, William J.}, Differential forms canonically associated to even-dimensional compact conformal manifolds, 211-225 [Zbl 1064.58025] \textit{Várilly, Joseph C.}, The interface of noncommutative geometry and physics, 227-242 [Zbl 1065.58005] \textit{Brini, Andrea; Regonati, Francesco; Teolis, Antonio}, The method of virtual variables and representations of Lie superalgebras, 245-263 [Zbl 1195.17005] \textit{Eastwood, Michael}, Algebras like Clifford algebras, 265-278 [Zbl 1066.15031] \textit{Fauser, Bertfried}, Grade free product formulae from Grassmann-Hopf gebras, 279-303 [Zbl 1101.15030] \textit{Hahn, Alexander}, The Clifford algebra in the theory of algebras, quadratic forms, and classical groups, 305-322 [Zbl 1157.11309] \textit{Helmstetter, Jacques}, Lipschitz's methods of 1886 applied to symplectic Clifford algebras, 323-333 [Zbl 1107.15027] \textit{Helmstetter, Jacques}, The group of classes of involutions of graded central simple algebras, 335-341 [Zbl 1107.16300] \textit{Marks, Dennis W.}, A binary index notation for Clifford algebras, 343-350 [Zbl 1068.15040] \textit{Schmeikal, Bernd}, Transposition in Clifford algebra: SU(3) from reorientation invariance, 351-372 [Zbl 1066.15033] \textit{Baylis, William E.}, The quantum/classical interface: insights from Clifford's (geometric) algebra, 375-391 [Zbl 1067.83010] \textit{Bonechi, Francesco; Ciccoli, Nicola; Tarlini, Marco}, Standard quantum spheres, 393-399 [Zbl 1157.58301] \textit{Budinich, Paolo}, Clifford algebras, pure spinors and the physics of fermions, 401-416 [Zbl 1079.81035] \textit{Chen, Chiang-Mei; Nester, James M.; Tung, Roh-Suan}, Spinor formulations for gravitational energy-momentum, 417-430 [Zbl 1066.83529] \textit{Daviau, Claude}, Chiral Dirac equations, 431-450 [Zbl 1079.81033] \textit{Dray, Tevian; Manogue, Corinne A.}, Using octonions to describe fundamental particles, 451-466 [Zbl 1079.81036] \textit{Lasenby, Anthony; Doran, Chris; Arcaute, Elsa}, Applications of geometric algebra in electromagnetism, quantum theory and gravity, 467-489 [Zbl 1066.83508] \textit{Majid, Shahn}, Noncommutative physics on Lie algebras, \((\mathbb{Z}_2)^n\) lattices and Clifford algebras, 491-518 [Zbl 1072.81034] \textit{Owczarek, Robert M.}, Dirac operator on quantum homogeneous spaces and noncommutative geometry, 519-530 [Zbl 1069.81027] \textit{Pozo, Jose M.; Parra, Josep M.}, \(r\)-fold multivectors and superenergy, 531-546 [Zbl 1066.15032] \textit{Trayling, Greg; Baylis, William E.}, The \(C\ell_7\) approach to the standard model, 547-558 [Zbl 1065.81609] \textit{Perwass, Christian; Gebken, Christian; Sommer, Gerald}, Implementation of a Clifford algebra co-processor design on a field programmable gate array, 561-575 [Zbl 1070.68514] \textit{Koenderink, Jan J.}, Image space, 577-596 [Zbl 1069.94002] \textit{Rosenhahn, Bodo; Sommer, Gerald}, Pose estimation of cycloidal curves by using twist representations, 597-612 [Zbl 1066.65028]