Quantum clifford hopf algebra for quantum field theory
Fauser, Bertfried^1
1Universitat Konstanz, Fachbereich Physik, Konstanz, Baden-Wurttemburg. Alemania
[Advances in applied Clifford algebras, México, 2003 Vol. 13 Núm. 2 Dic, Pág. 115-125]

Source function and Dyon's field in Clifford number representation for electrodynamics
Chernitskii, Alexander A^1
1Saint Petersburg State Technical University, San Petersburgo. Rusia
[Advances in applied Clifford algebras, México, 2003 Vol. 13 Núm. 2 Dic, Pág. 219-230]

The twistor structure of the biquaternionic projective point
Agnew, Alfonso^1
1California State University, Department of Mathematics, Fullerton, California. Estados Unidos de América
[Advances in applied Clifford algebras, México, 2003 Vol. 13 Núm. 2 Dic, Pág. 231-240]

Clifford tetrads, null zig zags, and quantum gravity
Cohen, Marcus S^1
1New Mexico State University, Department of Mathematical Science, Las Cruces, Nuevo México. Estados Unidos de América
[Advances in applied Clifford algebras, México, 2003 Vol. 13 Núm. 1 Jun, Pág. 71-106]

Generalized self-duality of 2 forms
Degirmenci, N¹; Kocak, S
¹Anadolu University, Mathematics Department, Eskisehir. Turquía
[Advances in applied Clifford algebras, México, 2003 Vol. 13 Núm. 1 Jun, Pág. 107-113]

Hardy spaces on the quaternions
Zhao, Jiman^1
1Beijing Normal University, Department of Mathematics, Beijing. China
[Advances in applied Clifford algebras, México, 2003 Vol. 13 Núm. 1 Jun, Pág. 47-55]

Hyperbolic quantum mechanics
Khrennikov, Andrei^1
1University of Vaxjo, Internationa Center for Mathematical Modeling in Physics and Cognitive Science, Vaxjo. Suecia
[Advances in applied Clifford algebras, México, 2003 Vol. 13 Núm. 1 Jun, Pág. 1-9]

Kamiwaai-interactive 3D sketching with java based on C1(4,1) conformal model of euclidean space
Hitzer, Eckard M. S^1
1Fukui University, Department of Mechanical, Fukui. Japón
[Advances in applied Clifford algebras, México, 2003 Vol. 13 Núm. 1 Jun, Pág. 11-45]

N-dimensional space-time unit spheres and Lorentz transformation
Wuming Li^1
1Tonghua Teacher's College, Institute of Mathematics and Physics, Tohghua, Jilin. China
[Advances in applied Clifford algebras, México, 2003 Vol. 13 Núm. 1 Jun, Pág. 57-64]

The geometrical interpretations of uncertainty relation in Minkowski space
Yu Xuegans¹; Yu Xueqian^2
1Tonghua Teacher's College, Department of Phisics, Tonghua, Jilin. China; ²Tonghua Vocational College, Tonghua, Jilin. China
[Advances in applied Clifford algebras, México, 2003 Vol. 13 Núm. 1 Jun, Pág. 65-70]

Comparative study of mixed product and quaternion product
Alam, Shah^1
1Shahjalal University of Science and Technology, Department of Physics, Sylhet, Bangladesh. India
[Advances in applied Clifford algebras, México, 2002 Vol. 12 Núm. 2 Dic, Pág. 189-194]

Covariances of the Dirac and Maxwell equations
Bayro Corrochano, Eduardo¹; Lounesto, Pertti²; Puska, Perttu^3
1Instituto Politécnico Nacional, Centro de Investigación y de Estudios Avanzados, Guadalajara, Jalisco. México; ²University of Helsinki, Department of Mathematics, Helsinki. Finlandia; ³Helsinki University of Technology, Electromagnetics Laboratory, Espoo, Uusima. Finlandia
[Advances in applied Clifford algebras, México, 2002 Vol. 12 Núm. 2 Dic, Pág. 91-108]

Multivector differential calculus
Hitzer, Eckhard^1
1Fukui University, Department of Mechanical Engineering, Fukui. Japón
[Advances in applied Clifford algebras, México, 2002 Vol. 12 Núm. 2 Dic, Pág. 135-182]

New approach to the positron equation by means of the algebraic structure or the ideals
Miralles, D¹; Parra, J.M; Vaz-Junior, J^2
1Universidad de Barcelona, Departamento de Física Fundamental, Barcelona. España; ²Universidade Estadual de Campinas, Departamento de Matematica Aplicada, Campinas, Sao Paulo. Brasil
[Advances in applied Clifford algebras, México, 2002 Vol. 12 Núm. 2 Dic, Pág. 183-188]

Quaternions as reflexive skew fields
Van Praag, Paul^1
1Universite de Mons-Hainaut, Institut de Mathematique "Le Pentagone", Mons, Hainaut. Bélgica
[Advances in applied Clifford algebras, México, 2002 Vol. 12 Núm. 2 Dic, Pág. 235-249]

The geometric associative algebras of Euclidean space
Joyce, W.P¹; Butler, P.H
¹University of Canterbury, Department of Physics and Astronomy, Christchurch, Canterbury. Nueva Zelanda
[Advances in applied Clifford algebras, México, 2002 Vol. 12 Núm. 2 Dic, Pág. 195-233]

The structure of the solutions of polynomial Dirac equations in real Clifford analysis
Gong Yafang¹; Du Jinyuan
¹Wuhan University, Department of Mathematics, Wuhan, Hubei. China
[Advances in applied Clifford algebras, México, 2002 Vol. 12 Núm. 2 Dic, Pág. 125-134]

Triality, biquaternion and vector representation of the Dirac equation
Liu Yu Fen^1
1Academia Sinica, Institute of Theoretical Physics, Beijing. China
[Advances in applied Clifford algebras, México, 2002 Vol. 12 Núm. 2 Dic, Pág. 109-124]

A formal definition of carriers
Keller, Jaime¹; Weinberger, Peter^2
1Technical University of Viena, Center for Computational Materials Science, Viena. Austria; ²Universidad Nacional Autónoma de México, Facultad de Estudios Superiores Cuautitlán, Cuautitlán, Estado de México. México
[Advances in applied Clifford algebras, México, 2002 Vol. 12 Núm. 1 Dic, Pág. 39-62]

An elementary construction of the geometric algebra
Macdonald, Alan^1
1Luther College, Department of Mathematics, Decorah, Iowa. Estados Unidos de América
[Advances in applied Clifford algebras, México, 2002 Vol. 12 Núm. 1 Dic, Pág. 1-6]