On log canonical inversion of adjunction
Christopher D. Hacon
TL;DR
This paper extends the inversion of adjunction principle for log canonical pairs to centers of any codimension, broadening its applicability in algebraic geometry.
Contribution
It generalizes Kawakita's result, providing a more comprehensive understanding of log canonical pairs and their centers.
Findings
Proved a generalized inversion of adjunction for log canonical centers of arbitrary codimension.
Extended Kawakita's previous result to a wider class of pairs.
Enhanced the theoretical framework for singularity analysis in algebraic geometry.
Abstract
We prove a result on the inversion of adjunction for log canonical pairs that generalizes Kawakita's result to log canonical centers of arbitrary codimension.
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