Abstract
Abstract
Let
$(X,B)$
be a pair, and let
$f \colon X \rightarrow S$
be a contraction with
$-({K_{X}} + B)$
nef over S. A conjecture, known as the Shokurov–Kollár connectedness principle, predicts that
$f^{-1} (s) \cap \operatorname {\mathrm {Nklt}}(X,B)$
has at most two connected components, where
$s \in S$
is an arbitrary schematic point and
$\operatorname {\mathrm {Nklt}}(X,B)$
denotes the non-klt locus of
$(X,B)$
. In this work, we prove this conjecture, characterizing those cases in which
$\operatorname {\mathrm {Nklt}}(X,B)$
fails to be connected, and we extend these same results also to the category of generalized pairs. Finally, we apply these results and the techniques to the study of the dual complex for generalized log Calabi–Yau pairs, generalizing results of Kollár–Xu [Invent. Math. 205 (2016), 527–557] and Nakamura [Int. Math. Res. Not. IMRN13 (2021), 9802–9833].
Publisher
Cambridge University Press (CUP)
Subject
Computational Mathematics,Discrete Mathematics and Combinatorics,Geometry and Topology,Mathematical Physics,Statistics and Probability,Algebra and Number Theory,Theoretical Computer Science,Analysis
Cited by
4 articles.
订阅此论文施引文献
订阅此论文施引文献,注册后可以免费订阅5篇论文的施引文献,订阅后可以查看论文全部施引文献