Castelnuovo–Mumford regularity algebraic geometry , the Castelnuovo–Mumford regularity of a coherent sheaf F over projective space P n r such that it is r-regular , meaning thati > 0. The regularity of a subscheme is defined to be the regularity of its sheaf of ideals . The regularity controls when the Hilbert function of the sheaf becomes a polynomial; more precisely dim H 0 is a polynomial in m when m is at least the regularity. The concept of r -regularity was introduced by, who attributed the following results to :idea exists in commutative algebra . Suppose R = k is a polynomial ring over a field k and M is a finitely generated graded R -module. Suppose M has a minimal graded free resolution let b j generators of F j r is an integer such that b j j ≤ r for all j , then M is said to be r -regular. The regularity of M is the smallest such r .coincide when F is a coherent sheaf such that Ass contains no closed points . Then the graded module is finitely generated and has the same regularity as F .
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