6533b839fe1ef96bd12a635d

RESEARCH PRODUCT

p −1-Linear Maps in Algebra and Geometry

Manuel BlickleKarl Schwede

subject

010102 general mathematicsFrobenius splittingField (mathematics)Algebraic geometryLocal cohomology01 natural sciencesCoherent sheafAlgebraLine bundle0103 physical sciencesGravitational singularity010307 mathematical physics0101 mathematicsTight closureMathematics

description

At least since Habousch’s proof of Kempf’s vanishing theorem, Frobenius splitting techniques have played a crucial role in geometric representation theory and algebraic geometry over a field of positive characteristic. In this article we survey some recent developments which grew out of the confluence of Frobenius splitting techniques and tight closure theory and which provide a framework for higher dimension geometry in positive characteristic. We focus on local properties, i.e. singularities, test ideals, and local cohomology on the one hand and global geometric applicatioms to vanishing theorems and lifting of sections on the other.

yearjournalcountryeditionlanguage
2012-12-16
https://doi.org/10.1007/978-1-4614-5292-8_5