Algebraic Montgomery-Yang problem and smooth obstructions
Abstract
Let be a rational homology complex projective plane with quotient singularities. The algebraic Montgomery-Yang problem conjectures that the number of singular points of is at most three if its smooth locus is simply-connected. In this paper, we leverage results from the study of smooth 4-manifolds, including the Donaldson diagonalization theorem and Heegaard Floer correction terms, to establish additional conditions for . As a result, we eliminate the possibility of a rational homology complex projective plane of specific types with four singularities. Moreover, we identify large families encompassing infinitely many types of singularities that satisfy the orbifold BMY inequality, a key property in algebraic geometry, yet are obstructed from being a rational homology complex projective plane due to smooth conditions. Additionally, we discuss computational results related to this problem, offering new insights into the algebraic Montgomery-Yang problem.
Cite
@article{arxiv.2402.04569,
title = {Algebraic Montgomery-Yang problem and smooth obstructions},
author = {Woohyeok Jo and Jongil Park and Kyungbae Park},
journal= {arXiv preprint arXiv:2402.04569},
year = {2024}
}
Comments
26 pages, 14 figures, minor revisions for the purpose of correcting typos and refining the language