Kähler–Ricci flow

E255017

Kähler–Ricci flow is a geometric evolution equation that deforms Kähler metrics on complex manifolds according to their Ricci curvature, playing a central role in complex differential geometry and the study of canonical metrics.

All labels observed (2)

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Statements (49)

Predicate Object
instanceOf evolution equation
geometric flow
partial differential equation
actsOn Kähler metrics
complex manifolds
convergesTo Kähler–Einstein metric
canonical current in singular settings
definedOn Kähler manifold
developedBy Gabriele La Nave
Gang Tian
Huai-Dong Cao
Jian Song
Shing-Tung Yau
Song Sun
Valentino Tosatti
equationForm ∂g_{i\bar{j}}/∂t = -R_{i\bar{j}}
∂ω/∂t = -Ric(ω)
field Kähler geometry
Riemannian manifolds
surface form: Riemannian geometry

complex differential geometry
geometric analysis
goal construct canonical metrics
study canonical metrics on complex manifolds
study existence of Kähler–Einstein metrics
hasVariant conical Kähler–Ricci flow
normalized Kähler–Ricci flow
twisted Kähler–Ricci flow
Kähler–Ricci flow self-linksurface differs
surface form: volume-normalized Kähler–Ricci flow
introducedBy Shing-Tung Yau
normalizationPurpose control cohomology class of the Kähler form
keep total volume fixed
preserves Kähler condition
complex structure
relatedTo Calabi conjecture
Ricci flow
Monge–Ampère equation
surface form: Yau’s solution of the Calabi conjecture

Monge–Ampère equation
surface form: complex Monge–Ampère flow

minimal model program
specializationOf Ricci flow
studies formation of singularities
long-time behavior of Kähler metrics
usedFor canonical metrics on Calabi–Yau manifolds
canonical metrics on Fano manifolds
canonical metrics on general type manifolds
finding Kähler–Einstein metrics on Fano manifolds
studying complex Monge–Ampère equations
studying minimal model program in algebraic geometry
studying singularities of complex varieties
uses Ricci curvature

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Referenced by (2)

Full triples — surface form annotated when it differs from this entity's canonical label.

Ricci flow hasVariant Kähler–Ricci flow
Kähler–Ricci flow hasVariant Kähler–Ricci flow self-linksurface differs
this entity surface form: volume-normalized Kähler–Ricci flow