2021
DOI: 10.2140/apde.2021.14.1951
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On sharp lower bounds for Calabi-type functionals and destabilizing properties of gradient flows

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Cited by 13 publications
(11 citation statements)
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“…Calabi flow) and minimize an L 2 -normalized non-Archimedean Ding-invariant (resp. L 2 -normalized radial Calabi-functional) (see [42,83]). In this paper we are interested in optimal degenerations that arise in the study of Hamilton-Tian conjecture about the long time behavior of Kähler-Ricci flows.…”
Section: Introductionmentioning
confidence: 99%
“…Calabi flow) and minimize an L 2 -normalized non-Archimedean Ding-invariant (resp. L 2 -normalized radial Calabi-functional) (see [42,83]). In this paper we are interested in optimal degenerations that arise in the study of Hamilton-Tian conjecture about the long time behavior of Kähler-Ricci flows.…”
Section: Introductionmentioning
confidence: 99%
“…[Ino2] of µ λ -cscK metrics, we encounter extremal metrics in the limit λ → −∞. Here we observe its non-archimedean counterpart: in the limit λ → −∞ the nonarchimedean µ-entropy is related to normalized Donaldson-Futaki invariant which appears in Donaldson-Xia's minimax principle [Don1,Xia1]. See also [Don2,Sze1], [Der1,Der2,Ino4] and section 4.3.3.…”
Section: It Follows From What We Proved That μλmentioning
confidence: 66%
“…[He,CSW,DS,HL2,BLXZ]). We also refer to analytic result for Calabi flow [Xia1]. We will discuss these works from our non-archimedean perspective in section 4.3.1 and section 4.3.3.…”
Section: −2πmentioning
confidence: 99%
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