In this note we revisit and extend few classical and recent results on the definition and use of the Futaki invariant in connection with the existence problem for Kähler constant scalar curvature metrics on polarized algebraic manifolds, especially in the case of resolution of singularities. The general inspiration behind this work is no doubt the beautiful paper by Ding and Tian [16] which contains the germs of a huge amount of the successive developments in this fundamental problem, and it is a great pleasure to dedicate this to Professor G. Tian on the occasion of his birthday.
Arezzo, C., Della Vedova, A. (2020). Big and Nef Classes, Futaki Invariant and Resolutions of Cubic Threefolds. In Jingyi Chen Peng LuZhiqin LuZhou Zhang (a cura di), Geometric Analysis (pp. 1-16). Birkhauser [10.1007/978-3-030-34953-0_1].
Big and Nef Classes, Futaki Invariant and Resolutions of Cubic Threefolds
Della Vedova, A
2020
Abstract
In this note we revisit and extend few classical and recent results on the definition and use of the Futaki invariant in connection with the existence problem for Kähler constant scalar curvature metrics on polarized algebraic manifolds, especially in the case of resolution of singularities. The general inspiration behind this work is no doubt the beautiful paper by Ding and Tian [16] which contains the germs of a huge amount of the successive developments in this fundamental problem, and it is a great pleasure to dedicate this to Professor G. Tian on the occasion of his birthday.
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