Associative Local Function Rings

Abstract

We prove that for an arbitrary field k, a complete, associative kr-algebra H augmented over kr has exactly r maximal two-sided ideals and deserves the name r-pointed. If A is any k-algebra, M=\Mi\i=1r is a family of simple right A-modules with a countable k-basis, and there is a homomorphism A:A→ H(Hkr(i=1r Mi))=: O(M) then O(M) is r-pointed and M is contained in the set of right simple O(M)-modules. Our main result is that the subalgebra generated A(A) and all A(a)-1 whenever A(a) is a unit, is a natural substitute for the localization A(M) of the k-algebra A in M which only exists when the Ore condition is fulfilled.

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