Seminari del Dipartimento
Analisi Matematica On neighborhoods of embedded complex tori Laurent Stolovitch 27-04-2022 - 14:30 Largo San Leonardo Murialdo,1 - Pal.C
In this talk, we show that an $n$-dimensional complex torus embedded in a complex manifold of dimensional $n+d$, with a split tangent bundle, has neighborhood biholomorphic a neighborhood of the zero section in its normal bundle, provided the latter has (locally constant) Hermitian transition functions and satisfies a {it non-resonnant Diophantine} condition. |