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110 BIBLIOGRAFÍA [Mk3] A. Masuoka, ‘The p n theorem for semisimple Hopf algebras’, Proc. Amer. Math. Soc. 124 (1996), no. 3, 735–737. [Mk4] A. Masuoka, ‘Examples of almost commutative Hopf algebras which are not coquasitriangular’, Hopf algebras, Lecture Notes in Pure and Appl. Math., 237 (2004), Dekker, New York, 185–191. [Mk5] A. Masuoka, ‘Defending the negated Kaplansky conjecture’, Proc. Am. Math. Soc. 129 (2001), no. 11, 3185–3192. [Mo] S. Montgomery, Hopf Algebras y their Actions on Rings, CBMS Reg. Conf. Ser. Math. 82 (1993). American Mathematical Society (AMS). [MuI] E. Müller, ‘Some topics on Frobenius-Lusztig kernels I’, J. Algebra 206 (1998), no. 2, 624–658. [MuII] E. Müller, ‘Some topics on Frobenius-Lusztig kernels II’, J. Algebra 206 (1998), no. 2, 659–681. [Mu2] E. Müller, ‘Finite subgroups of the quantum general linear group’, Proc. London Math. Soc. (3) 81 (2000), no. 1, 190–210. [Na1] S. Natale, ‘Quasitriangular Hopf algebras of dimension pq’, Bull. Lond. Math. Soc. 34 (2002), no. 3, 301–307. [Na2] S. Natale, ‘On semisimple Hopf algebras of dimension pq 2 ’, J. Algebra 221 (1999), no. 1, 242–278. [Ng] S-H. Ng, ‘Non-semisimple Hopf algebras of Dimension p 2 ’, J. Algebra 255 (2002), no. 1, 182–197. [NZ] W.D. Nichols y M. B. Zoeller, ‘A Hopf algebra freeness Theorem’, Am. J. Math. 111 (1989), no. 2, 381–385. [OSch1] U. Oberst y H-J. Schneider, ‘Untergruppen formeller Gruppen von endlichem Index’, J. Algebra 31 (1974), 10–44. [OSch2] U. Oberst y H-J. Schneider, ‘Über Untergruppen endlicher algebraischer Gruppen’, Manuscripta Math. 8 (1973), 217–241. [PW] A. Pianzolla y A. Weiss, ‘The Rationality of Elements of Prime Order in Compact Connected Simple Lie Groups’, J. Algebra 144 (1991), 510–521. [R] [R1] R.W. Richardson, ‘Orbits, invariants, and representations associated to involutions of reductive groups’ Invent. Math. 66, 287-312 (1982). D. Radford, ‘The order of the antipode of a finite dimensional Hopf algebra is finite’, Am. J. Math. 98 (1976), no 2, 333–355. [R2] D. Radford, ‘Minimal quasitriangular Hopf algebras’, J. Algebra 157 (1993), no. 2, 285– 315.
BIBLIOGRAFÍA 111 [R3] D. Radford, ‘The Trace Functions and Hopf algebras’, J. Algebra 163 (1994), no. 3, 583– 622. [R4] D. Radford, ‘On Kauffman’s Knot Invariants Arising from Finite-Dimensional Hopf algebras’, Advances in Hopf algebras, Lec. Notes Pure Appl. Math. 158, 205–266, Marcel Dekker, N. Y., 1994. [R5] D. Radford, ‘Hopf algebras with a projection’, J. Algebra 92 (1985), no. 2, 322–347. [R6] D. Radford, ‘On a coradical of a finite-dimensional Hopf algebra’, Proc. Amer. Math. Soc. 53 (1975), no. 1, 9–15. [RS1] D. Radford y H-J. Schneider, ‘Comunicación oral’, (2002). [RS2] D. Radford y H-J. Schneider, ‘On the even powers of the antipode of a finite-dimensional Hopf algebra’ J. Algebra 251 (2002), no. 1, 185–212. [S] J. P. Serre, ‘Exemples de plongements des groups P SL 2 (F p ) dans des groupes de Lie simples’, Invent. Math. 124 (1996), no. 1-3, 525-562. [Sbg] P. Schauenburg, ‘Hopf bi-Galois extensions’, Comm. Algebra 24 (1996), no. 12, 3797–3825. [Sch1] H-J. Schneider, ‘Some remarks on exact sequences of quantum groups’, Commun. Algebra 21 (1993), no. 9, 3337–3357. [Sch2] H-J. Schneider, ‘Normal basis and transitivity of crossed products for Hopf algebras’, J. Algebra 152 (1992), no. 2, 289–312. [Sch3] H-J. Schneider, ‘Lectures on Hopf algebras’ (1995), Trabajos de Matemática 31/95 (Fa- MAF, 1995). [St] D. Stefan, ‘Hopf algebras of low dimension’ J. Algebra 211 (1999), no. 1, 343–361. [SvO] D. Stefan y F. van Oystaeyen, ‘Hochschild cohomology and coradical filtration of pointed coalgebras: Applications’, J. Algebra 210 (1998), no. 2, 535–556. [Sw] M. Sweedler , ‘Hopf algebras’, Benjamin, New York, 1969. [Tk] [W] M. Takeuchi, ‘Survey of braided Hopf algebras’, in “New Trends in Hopf Algebra Theory"; Contemp. Math. 267 (2000), 301–324. R. Williams, ‘Finite dimensional Hopf algebras’, Ph. D. Thesis, Florida State University (1988). [Z] Y. Zhu, ‘Hopf algebras of prime dimension’ Internat. Math. Res. Notices 1 (1994), 53–59.
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Álgebras de Hopf y Grupos Cuántic
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Índice general Resumen Abstract Ag
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Resumen En esta tesis discutimos al
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Abstract In this thesis we discuss
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Agradecimientos Esta tesis ha sido
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viii INTRODUCCIÓN mostró que dete
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x INTRODUCCIÓN En el Capítulo 3 d
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xii INTRODUCCIÓN Luego de estos do
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xiv INTRODUCCIÓN Finalmente, para
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Capítulo 1 Preliminares En este ca
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1.1. DEFINICIONES Y RESULTADOS BÁS
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1.2. COHOMOLOGÍA DE GRUPOS 9 lo cu
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12 CAPÍTULO 2. EXTENSIONES DE ÁLG
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28 CAPÍTULO 3. SOBRE ÁLGEBRAS DE
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Capítulo 4 Extensiones de grupos c
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4.1. ÁLGEBRAS DE COORDENADAS CUANT
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4.2. COCIENTES DE O ɛ (G) DE DIMEN
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Page 129 and 130: Bibliografía [A1] [A2] N. Andruski
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