MONOID ALGEBRAS OVER NON-COMMUTATIVE RINGS

Yıl 2007, Cilt: 2 Sayı: 2, 25 - 53, 01.12.2007

E. P. Cojuhari

Öz

We define on an arbitrary ring A a family of mappings (σx,y) subscripted with elements of a multiplicative monoid G. The assigned properties allow to call these mappings as derivations of the ring A. Beside the general situation it is given their description for the case of a partially ordered monoid. A monoid algebra of G over A is constructed explicitly, and the universality property of it is shown. The notion of a monoid algebra in our context extends those of a group ring, a skew polynomial ring, Weyl algebra and other related ones. The connection with crossed products is also shown.

Anahtar Kelimeler

Derivations, monoid algebras, free algebras, skew polynomial rings

Kaynakça

• L. Bonami, On the structure of skew group rings, M¨unchen: Verlag R. Fischer, A.A. Bovdi, Group rings. Kiev UMK VO. (Russian), 1988.
• A.A. Bovdi, Crossed products of a semigroup and a ring. Sibirsk. Mat. Zh. 4 (1963), 481-499.
• P.M. Cohn, Free rings and their relations. Academic Press, London, New-York, C. Faith, Algebra: rings, modules and categories I. Springer-Verlag, Berlin, Heidelberg, New-York, 1973.
• G. Karpilovsky, Commutative group algebras. New-York, 1983.
• G. Karpilovsky, The algebraic structure of crossed products. Amsterdam: North-Holland, 1987.
• S. Lang, Algebra. Addison Wesley, Reading, Massachusetts, 1970.
• J.C. McConnell, J.C. Robson, Noncommutative Noetherian Rings. Wiley, New York, 1987.
• O. Ore, Theory of non-commutative polynomials. Annals of Mathematics, no. (1933), 480-508.
• D.S. Passman, The algebraic structure of group rings. Wiley-Interscience, New York , 1977.
• D.S. Passman, InŞnite crossed products. Academic Press, Boston, 1989.
• Yu.M. Ryabukhin, Quasi-regular algebras, modules, groups and varieties. Buletinul A.S.R.M., Matematica, no.1(23) (1997), 6-62 (Russian).
• T.H.M. Smits, Nilpotent S - derivations. Indag. Math. 30 (1968), 72-86.
• T.H.M. Smits, Skew polynomial rings. Indag. Math. 30 (1968), 209-224.
• T.H.M. Smits, The free product of a quadratic number Şeld and semiŞeld. Indag. Math., 31 (1969), 145-159.
• A.E. Zalesskii, A.V. Mihalev, Group rings. in: Itogi Nauki i Tech., Ser. ”Sovr. probl. mat.”, vol.2, M., 1973 (Russian). E. P. Cojuhari
• Department of Mathematical Modelling and Economical Informatics, State University of Moldova, str. A. Mateevici 60, MD-2009, Chisinau, Moldova
• E-mail: cojuhari@usm.md