A formula for the \alpha-Futaki character
Kartick Ghosh
TL;DR
This paper derives a formula for the alpha-Futaki character on toric manifolds, demonstrating non-existence of solutions for certain ample line bundles and relating findings to existing results in dimension two.
Contribution
It provides a new explicit formula for the alpha-Futaki character on toric manifolds and applies it to establish non-existence results and compute critical alpha values.
Findings
No solutions with alpha > 0 on certain ample line bundles over specific toric manifolds.
Explicit formula for the alpha-Futaki character on these manifolds.
Connection to Keller-Friedman existence results in dimension two.
Abstract
Alvarez-Consul--Garcia-Fernandez--Garcia-Prada introduced the K\"ahler-Yang-Mills equations. They also introduced the -Futaki character, an analog of the Futaki invariant, as an obstruction to the existence of the K\"ahler-Yang-Mills equations. The equations depend on a coupling constant . Solutions of these equations with coupling constant are of utmost importance. In this paper, we provide a formula for the -Futaki character on certain ample line bundles over toric manifolds. We then show that there are no solutions with on certain ample line bundles over certain toric manifolds and compute the value of if a solution exists. We also relate our result to the existence result of Keller-Friedman in dimension-two.
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Taxonomy
TopicsAdvanced Algebra and Geometry · advanced mathematical theories · Advanced Topics in Algebra