Ter­min

Ober­se­mi­nar Al­ge­bra und Al­ge­brai­sche Geo­me­trie: De­e­pan­shu Pra­sad (So­fia, Bul­ga­ri­en): An Ex­ten­si­on of Sa­to-Ki­mu­ra The­o­rem for Se­mi-in­va­ri­a­nt rings

Ort: A3.339

Title: An Extension of Sato-Kimura Theorem for Semi-invariant rings

Abstract: We prove an analog of a theorem of Sato–Kimura for semi-invariant rings arising from representations of finite-dimensional algebras over an algebraically closed field K of characteristic 0. Assuming the coordinate ring is factorial and the representation variety has generic orbits of codimension one, we show that the semi-invariant ring is a complete intersection and describe the structure of the ring. We also discuss the hereditary case, where these results admit a more explicit interpretation. This is joint work with Charles Paquette and David Wehlau.