Finite TYCZ expansions and cscK metrics

Abstract

Let (M, g) be a Kaehler manifold whose associated Kaehler form ω is integral and let (L, h)→ (M, ω) be a quantization hermitian line bundle. In this paper we study those Kaehler manifolds (M, g) admitting a finite TYCZ expansion. We show that if the TYCZ expansion is finite then Tmg is indeed a polynomial in m of degree n, n=dim M, and the log-term of the Szeg\"o kernel of the disc bundle D⊂ L* vanishes (where L* is the dual bundle of L). Moreover, we provide a complete classification of the Kaehler manifolds admitting finite TYCZ expansion either when M is a complex curve or when M is a complex surface with a cscK metric which admits a radial Kaehler potential.