Remarks on two problems by Hassett
Abstract
One of the ultimate goals of the Hassett-Keel program is the determination of the log canonical models of the moduli spaces of pointed rational curves . In this paper, we study log canonical models of with \textit{asymmetric} boundary divisors. Our results generalize previous work by Alexeev-Swinarski, Fedorchuk-Smyth, Kiem-Moon and Simpson for the first non-trivial case, namely . We prove that all moduli spaces of weighted pointed rational curves arise as log canonical models of for suitable choices of boundary coefficients, thereby also recovering a theorem of Fedorchuk and Moon. In addition, we relate these moduli spaces to Deligne-Mostow ball quotients. We further study log canonical models of the moduli spaces with symmetric weight, which differ from . The case can be viewed as an explicit guiding example in a very general program and the paper can thus also serve as an expository introduction.
Cite
@article{arxiv.2507.12623,
title = {Remarks on two problems by Hassett},
author = {Klaus Hulek and Yota Maeda},
journal= {arXiv preprint arXiv:2507.12623},
year = {2026}
}
Comments
21 pages, Expanded presentation, to appear: Festschrift for Yuri Tschinkel's 60th birthday (Simons Symposia)