Maximal ideals and representations of twisted forms of algebras
Abstract
Given a central simple algebra g and a Galois extension of base rings S/R, we show that the maximal ideals of twisted S/R-forms of the algebra of currents g(R) are in natural bijection with the maximal ideals of R. When g is a Lie algebra, we use this to give a complete classification of the finite-dimensional simple modules over twisted forms of g(R).
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