Birational Invariance in Punctured Log Gromov-Witten Theory
Abstract
Given a log smooth scheme (X,D), and a log \'etale modification (X,D) → (X,D), we relate the punctured Gromov-Witten theory of (X,D) to the punctured Gromov-Witten theory of (X,D), generalizing results of Abramovich and Wise in the non-punctured setting in "Birational invariance in log Gromov-Witten Theory". Using the main comparison results, we show a form of log \'etale invariance for the logarithmic mirror algebras and canonical scattering diagrams constructed in "Intrinsic Mirror Symmetry" and "The Canonical Wall Structure and Intrinsic Mirror Symmetry" respectively.
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