A representation theoretic study of noncommutative symmetric algebras
Abstract
We study Van den Bergh's noncommutative symmetric algebra Snc(M) (over division rings) via Minamoto's theory of Fano algebras. In particular, we show Snc(M) is coherent, and its proj category Pnc(M) is derived equivalent to the corresponding bimodule species. This generalizes the main theorem of minamoto, which in turn is a generalization of Beilinson's derived equivalence. As corollaries, we show that Pnc(M) is hereditary and there is a structure theorem for sheaves on Pnc(M) analogous to that for P1.
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