Kauta, John S.2024-07-122024-07-122009Kauta, J. S. (2009). Hereditary orders in the quotient ring of a skew polynomial ring. Maltepe Üniversitesi. s. 220.9.78605E+12https://hdl.handle.net/20.500.12415/2436Let K be a field, and let ? be an automorphism of K of finite order, say n. One can form a skew polynomial ring K[X, ?] over K with the usual rules of multiplication defined by the commutation rule: Xa = ?(a)X ? a ? K. Let K(X, ?) denote the skew field of quotients of K[X, ?]. If F is the fixed field of ?, then K(X, ?) is a cyclic algebra of degree n with center F (Xn). If V is a valuation ring of F (Xn) containing F , and S is the integral closure of V in K(Xn), then any order of K(X, ?) with center V can be written as a “crossed-product V -algebra”enCC0 1.0 Universalinfo:eu-repo/semantics/openAccessConference Object221220