Abstract
A classification of automorphisms, derivations, and Hopf algebra actions of the quantum plane and its completions is presented.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
REFERENCES
J. Alev and M. Chamarie, “Derivations et automorphismes de quelques algebres quantiques,” Commun. Algebra, 20, No.6, 1787–1802 (1992).
J. Alev and F. Dumas, “Invariants du corps de Weyl sous l'action de groupes finis,” Commun. Algebra, 25, No.5, 1655–1672 (1997).
V. A. Artamonov, “Automorphisms of division rings of quantum rational functions,” Mat. Sb., 191, No.12, 3–26 (2000).
V. A. Artamonov, “Valuations on quantum fields,” Commun. Algebra, 29, No.9, 3889–3904 (2001).
V. A. Artamonov, “Pointed Hopf algebras acting on quantum polynomials,” J. Algebra, 259, No.2, 323–352 (2003).
V. A. Artamonov and P. M. Cohn, “The skew field of rational functions on the quantum plane,” J. Math. Sci., 93, No.6, 824–829 (1999).
V. A. Artamonov and R. Wisbauer, “Homological properties of quantum polynomials,” Algebras Representation Theory, 4, No.3, 219–247 (2001).
C. J. B. Brookes, “Crossed products and finitely presented groups,” J. Group Theory, 3, 433–444 (2000).
K. A. Brown and K. R. Goodearl, Lectures on Algebraic Quantum Groups, Birkhauser, Basel-Boston (2002).
E. E. Demidov, Quantum Groups [in Russian], Faktorial, Moscow (1998).
J. C. McConnell and J. J. Pettit, “Crossed products and multiplicative analogues of Weyl algebras,” J. London Math. Soc., 38, No.1, 47–55 (1988).
A. I. Kokorin and V. M. Kopytov, Linearly Ordered Groups [in Russian], Nauka, Moscow (1972).
L. I. Korogodski and Y. I. Soibelman, Algebra of Functions on Quantum Groups, Part I, Amer. Math. Soc., Providence, Rhode Island (1998).
S. Montgomery, Hopf Algebras and Their Actions on Rings, Regional Conf. Ser. Math. Amer. Math. Soc., Providence, Rhode Island (1993).
Oh Sei-Qwon, Park Chun-Gil, and Shin Youg-Yeon, “Quantum n-space and Poisson n-space,” Commun. Algebra, 30, No.9, 4197–4209 (2002).
J. P. Osborn and D. Passman, “Derivations of skew polynomial rings,” J. Algebra, 176, No.2, 417–448 (1995).
L. Richard, “Sur les endomorphismes des tores quantiques,” Commun. Algebra, 30, No.11, 5282–5306 (2002).
I. R. Shafarevitch, Basic Notions of Algebra [in Russian], Itogi Nauki i Tekhn., Sovr. Probl. Mat., Fundam. Napr., 11, All-Union Institute for Scientific and Technical Information, Moscow (1986).
F. van Oystaeyen, Algebraic Geometry for Associative Algebras, Marcel Dekker, New York (2000).
O. Zarissky and P. Samuel, Commutative Algebra, Vol. II. Van Nostrand, Princeton, New Jersey (1960).
Author information
Authors and Affiliations
Additional information
__________
Translated from Sovremennaya Matematika i Ee Prilozheniya (Contemporary Mathematics and Its Applications), Vol. 18, Algebra, 2004.
Rights and permissions
About this article
Cite this article
Artamonov, V.A. Actions of Hopf Algebras on General Quantum Mal'tsev Power Series and Quantum Planes. J Math Sci 134, 1773–1798 (2006). https://doi.org/10.1007/s10958-006-0089-7
Issue Date:
DOI: https://doi.org/10.1007/s10958-006-0089-7