In this paper we introduce a construction called the skew generalized power series ring R[[S, Ï]] with coefficients in a ring R and exponents in a strictly ordered monoid S which extends Ribenboim's construction of generalized power series rings. In the case when S is totally ordered or commutative aperiodic, and Ï(s) is constant on idempotents for some s  S{1}, we give sufficient and necessary conditions on R and S such that the ring R[[S, Ï]] is von Neumann regular, and we show that the von Neumann regularity of the ring R[[S, Ï]] is equivalent to its semisimplicity. We also give a characterization of the strong regularity of the ring R[[S, Ï]].View full textDownload full textKey WordsArtinian and narrow set, Semisimple ring, Skew generalized power series ring, Strictly ordered monoid, Von Neumann regular ring2000 Mathematics Subject ClassificationPrimary 16E50, 16S99, Secondary 06F05Related var addthis_config = { ui_cobrand: "Taylor & Francis Online", services_compact: "citeulike,netvibes,twitter,technorati,delicious,linkedin,facebook,stumbleupon,digg,google,more", pubid: "ra-4dff56cd6bb1830b" }; Add to shortlist Link Permalink http://dx.doi.org/10.1080/00927870801941150
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