Moduli of linear representations, symmetric products and the non commutative Hilbert scheme
نویسنده
چکیده
Let k be a commutative ring and let R be a commutative k−algebra. Given a positive integer n and a R−algebra A one can consider three functors of points from the category CR of commutative R−algebras to the small category of sets. All these functors are representable, namely • RepA represents the functor induced by B → homR(A,Mn(B)), where Mn(B) are the n× n matrices over B, for all B ∈ CR. • the non-commutative Hilbert scheme HilbA represents the functor induced by
منابع مشابه
Geometric Methods in Representation Theory Fock Space Representations Fock Space Representations of U Q ( Sl N )
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