Abstract
The volume of a line bundle is defined in terms of a limsup. It is a fundamental question whether this limsup is a limit. It has been shown that this is always the case on generically reduced schemes. We show that volumes are limits in two classes of schemes that are not necessarily generically reduced: codimension one subschemes of projective varieties such that their components of maximal dimension contain normal points and projective schemes whose nilradical squared equals zero.
Citation
Roberto Núñez. "VOLUMES OF LINE BUNDLES AS LIMITS ON GENERICALLY NONREDUCED SCHEMES." Rocky Mountain J. Math. 52 (6) 2129 - 2143, December 2022. https://doi.org/10.1216/rmj.2022.52.2129
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