TL;DR
This paper extends a fundamental injectivity theorem and explores its implications for the structure of divisors of log canonical type, advancing the understanding of their geometric properties.
Contribution
It generalizes the existing injectivity theorem and applies it to analyze the structure of log canonical type divisors, providing new theoretical insights.
Findings
Generalized the injectivity theorem of Esnault and Viehweg.
Applied the generalized theorem to log canonical divisors.
Enhanced understanding of the structure of log canonical divisors.
Abstract
We generalize the injectivity theorem of Esnault and Viehweg, and apply it to the structure of log canonical type divisors.
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