2019
Jacob, Adam; Earp, Henrique N. Sá; Walpuski, Thomas
Tangent cones of Hermitian Yang–Mills connections with isolated singularities Journal Article
Em: Mathematical Research Letters, vol. 25, iss. 5, pp. 1429 – 1445, 2019.
Resumo | Links | BibTeX | Tags: Hermitian Yang–Mills
@article{nokey,
title = {Tangent cones of Hermitian Yang\textendashMills connections with isolated singularities},
author = {Adam Jacob and Henrique N. S\'{a} Earp and Thomas Walpuski},
url = {https://www.intlpress.com/site/pub/pages/journals/items/mrl/content/vols/0025/0005/a004/},
doi = {https://dx.doi.org/10.4310/MRL.2018.v25.n5.a4},
year = {2019},
date = {2019-02-01},
urldate = {2019-02-01},
journal = {Mathematical Research Letters},
volume = {25},
issue = {5},
pages = {1429 \textendash 1445},
abstract = {We give a simple direct proof of uniqueness of tangent cones for singular projectively Hermitian Yang\textendashMills connections on reflexive sheaves at isolated singularities modelled on a sum of -stable holomorphic bundles over .},
keywords = {Hermitian Yang\textendashMills},
pubstate = {published},
tppubtype = {article}
}
We give a simple direct proof of uniqueness of tangent cones for singular projectively Hermitian Yang–Mills connections on reflexive sheaves at isolated singularities modelled on a sum of -stable holomorphic bundles over .