TL;DR
This paper investigates the relationship between two invariants of singularities, the minimal log discrepancy and the log canonical threshold, as they approach zero, to understand their equivalence.
Contribution
It establishes conditions under which the minimal log discrepancy and the log canonical threshold are equivalent near zero for singularities.
Findings
Identifies the conditions for the invariants' equivalence near zero
Provides new insights into the behavior of singularity invariants
Enhances understanding of singularity classification
Abstract
We study the equivalence of approaching zero for two invariants of a singularity: the minimal log discrepancy and the log canonical threshold of the general hyperplane section.
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