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HOME > Table of Contents and Abstracts > Vol. 71, No. 4
Tohoku Mathematical Journal
2019
December
SECOND SERIES VOL. 71, NO. 4
Tohoku Math. J.
71 (2019), 495-524
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Title
RELATIVE ALGEBRO-GEOMETRIC STABILITIES OF TORIC MANIFOLDS
Author
Naoto Yotsutani and Bin Zhou
(Received December 20, 2016, revised October 2, 2017) |
Abstract.
In this paper we study the relative Chow and $K$-stability of toric manifolds. First, we give a criterion for relative $K$-stability and instability of toric Fano manifolds in the toric sense. The reduction of relative Chow stability on toric manifolds will be investigated using the Hibert-Mumford criterion in two ways. One is to consider the maximal torus action and its weight polytope. We obtain a reduction by the strategy of Ono [34], which fits into the relative GIT stability detected by Székelyhidi. The other way relies on $\mathbb{C}^*$-actions and Chow weights associated to toric degenerations following Donaldson and Ross-Thomas [13, 36]. In the end, we determine the relative $K$-stability of all toric Fano threefolds and present counter-examples which are relatively $K$-stable in the toric sense but which are asymptotically relatively Chow unstable.
Mathematics Subject Classification.
Primary 53C55; Secondary 14L24, 14M25.
Key words and phrases.
extremal metrics, $K$-stability, Chow stability, toric manifold.
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