Publication Type |
dissertation |
School or College |
College of Science |
Department |
Mathematics |
Author |
Das, Omprokash |
Title |
Adjunction and inversion of adjunction in positive characteristic |
Date |
2015-05 |
Description |
In this dissertation, we prove a characteristic p>0 analogue of the log terminal inversion of adjunction and show the equality of the two technical terms F-Different and Different conjectured by Schwede. We also prove a special version of the (relative) Kawamata-Viehweg vanishing theorem for 3-folds, normality of minimal log canonical centers, Kodaira's Canonical Bundle formula for family of rational curves, and the Adjunction Formula on Q-factorial 3-folds in characteristic p>5. |
Type |
Text |
Publisher |
University of Utah |
Subject |
Inversion of adjunction; KLT; Log terminal; Positive characteristic; Purely F-regular; Strongly F-regular |
Dissertation Name |
Doctor of Philosophy |
Language |
eng |
Rights Management |
Copyright © Omprokash Das 2015 |
Format Medium |
application/pdf |
Format Extent |
649,290 Bytes |
Identifier |
etd3/id/3742 |
ARK |
ark:/87278/s6g76nzz |
Setname |
ir_etd |
ID |
197293 |
Reference URL |
https://collections.lib.utah.edu/ark:/87278/s6g76nzz |