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Title: Wall-crossing in genus-zero hybrid theory
Abstract The hybrid model is the Landau–Ginzburg-type theory that is expected, via the Landau–Ginzburg/ Calabi–Yau correspondence, to match the Gromov–Witten theory of a complete intersection in weighted projective space. We prove a wall-crossing formula exhibiting the dependence of the genus-zero hybrid model on its stability parameter, generalizing the work of [21] for quantum singularity theory and paralleling the work of Ciocan-Fontanine–Kim [7] for quasimaps. This completes the proof of the genus-zero Landau– Ginzburg/Calabi–Yau correspondence for complete intersections of hypersurfaces of the same degree, as well as the proof of the all-genus hybrid wall-crossing [11].  more » « less
Award ID(s):
1810969
PAR ID:
10283052
Author(s) / Creator(s):
;
Date Published:
Journal Name:
Advances in Geometry
Volume:
0
Issue:
0
ISSN:
1615-715X
Format(s):
Medium: X
Sponsoring Org:
National Science Foundation
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