The Anomaly Flow over Riemann Surfaces

Teng, Fei; Huang, Zhijie; Picard, Sébastien

doi:10.1093/imrn/rnz076

Cited by 14 publications

(19 citation statements)

References 67 publications

(107 reference statements)

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“…It also inspired directly the solutions of the Fu-Yau Hessian equations found recently in [62], which extended our earlier work [55,58]. However, it is still largely unexplored, and its long-term behavior is already known to exhibit in general a rather intricate behavior, such as a particular sensitivity to the initial data [20,60,61].…”

Section: )mentioning

confidence: 66%

A flow of conformally balanced metrics with Kähler fixed points

2019

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While the Anomaly flow was originally motivated by string theory, its zero slope case is potentially of considerable interest in non-Kähler geometry, as it is a flow of conformally balanced metrics whose stationary points are precisely Kähler metrics. We establish its convergence on Kähler manifolds for suitable initial data. We also discuss its relation to some current problems in complex geometry. Motivations for the flowWe provide now some details on the three different contexts which make the flow (1.1) of particular interest. The Hull-Strominger systemLet X be a compact 3-fold equipped with a nowhere vanishing holomorphic (3, 0)-form Ω. Let t → Φ(t) be a flow of (2, 2)-forms with dΦ = 0 for any t. Then the following flow was

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Section: )mentioning

confidence: 66%

A flow of conformally balanced metrics with Kähler fixed points

2019

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“…Next we describe a very recent work of T. Fei, Z. Huang, and S. Picard [34,35]. Their set-up is certain hyperkähler fibrations over Riemann surfaces originating from works of Fei [31,32,33], which are themselves built on earlier constructions of Calabi [14] and Gray [49].…”

Section: The Anomaly Flow On Hyperkähler Fibrations Over Riemann Surfmentioning

confidence: 99%

“…where all norms and operators are taken with respect to the evolving metric ω(t). The following criterion for the long-time existence of the flow in this setting was proved in [35]:…”

Section: The Anomaly Flow On Hyperkähler Fibrations Over Riemann Surfmentioning

confidence: 99%

“…At the other end, it was proved in [35] that for initial data with e f large, then the flow will exist for all time, and collapse the fibers in the limit:…”

Section: )mentioning

confidence: 99%

“…which is monotone decreasing for arbitrary initial data. This functional was used in [35] to provide convergence of the normalized solution in the regime u ≥ 0. It is possible that the existence of solutions to the Hull-Strominger system may be tied to some stability condition.…”

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confidence: 99%

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New curvature flows in complex geometry

Phong

Picard

Zhang

2017

Surveys in Differential Geometry

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The Anomaly flow is a flow of (2, 2)-forms on a 3-fold which was originally motivated by string theory and the need to preserve the conformally balanced property of a Hermitian metric in the absence of a ∂∂-Lemma. It has revealed itself since to be a remarkable higher order extension of the Ricci flow. It has also led to several other curvature flows which may be interesting from the point of view of both non-Kähler geometry and the theory of non-linear partial differential equations. This is a survey of what is known at the present time about these new curvature flows.

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Solutions to the Hull–Strominger System with Torus Symmetry

Fino

Grantcharov

Vezzoni

2021

Commun. Math. Phys.

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We construct new smooth solutions to the Hull–Strominger system, showing that the Fu–Yau solution on torus bundles over K3 surfaces can be generalized to torus bundles over K3 orbifolds. In particular, we prove that, for $$13 \le k \le 22$$ 13 ≤ k ≤ 22 and $$14\le r\le 22$$ 14 ≤ r ≤ 22 , the smooth manifolds $$S^1\times \sharp _k(S^2\times S^3)$$ S 1 × ♯ k ( S 2 × S 3 ) and $$\sharp _r (S^2 \times S^4) \sharp _{r+1} (S^3 \times S^3)$$ ♯ r ( S 2 × S 4 ) ♯ r + 1 ( S 3 × S 3 ) , have a complex structure with trivial canonical bundle and admit a solution to the Hull–Strominger system.

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The Anomaly Flow over Riemann Surfaces

Cited by 14 publications

References 67 publications

A flow of conformally balanced metrics with Kähler fixed points

A flow of conformally balanced metrics with Kähler fixed points

New curvature flows in complex geometry

Solutions to the Hull–Strominger System with Torus Symmetry

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