Coherent I-indexed algebras and noncommutative projective schemes
Abstract
We study coherent I-indexed algebras and associated noncommutative projective schemes, where the index set I is a locally finite directed poset. Our main result is a characterisation of such noncommutative projective schemes in terms of sequences of objects with properties analogous to the sequence of tensor powers of an ample line bundle, extending a similar characterisation given by Polishchuk for coherent Z-indexed algebras.
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