K\"ahler-Ricci flow of cusp singularities on quasi projective varieties

Abstract

Let M be a compact complex manifold with smooth K\"ahler metric η, and let D be a smooth divisor on M. Let M=M D and let ω be a Carlson-Griffiths type metric on M. We study complete solutions to K\"ahler-Ricci flow on M which are comparable to ω, starting from a smooth initial metric ω0=η +i∂ ∂ φ0 where φ0∈ C∞(M). When ω0≥ c ω on M for some c>0 and φ0 has zero Lelong number, we construct a smooth solution ω(t) to K\"ahler-Ricci flow on M× [0, T[ω0 ]) where T[ω0 ]:= \ T: [η] +T (c1(KM) + c1(OD))∈ KM \ so that ω(t)≥ (1n - 4Ktc )ω for all t≤ c4nK where K is a non-negative upper bound on the bisectional curvatures of ω (see Theorem 1.2). In particular, we do not assume ω0 has bounded curvature. If ω0 has bounded curvature and is asymptotic to ω in an appropriate sense, we construct a complete bounded curvature solution on M× [0, T[ω0 ]) (see Theorem 1.3). These generalize some of the results of Lott-Zhang in [15]. On the other hand if we only assume ω0≥ c η on M for some c>0 and φ0 is bounded on M, we construct a smooth solution to K\"ahler-Ricci on M× [0, T[ω0 ]) which is equivalent to ω for all positive times. This includes as a special case when ω0 is smooth on M in which case the solution becomes instantaneously complete on M under K\"ahler-Ricci flow (see Theorem 1.1).