The asymptotics of the optimal holomorphic extensions of holomorphic jets along submanifolds (Q6590487)

The paper deals with the study of the asymptotics of the \(L^2\)-optimal holomorphic extensions of holomorphic jets associated to high tensor powers of a positive line bundle along a submanifold. In particular, for a complex submanifold in a complex manifold, the author considers the operator which for a given holomorphic jet of a vector bundle along the submanifold associates the \(L^2\)-optimal holomorphic extension of it to the ambient manifold. When the vector bundle is given by big tensor powers of a positive line bundle, he presents an asymptotic formula for this extension. As an important intermediate result he establishes the asymptotic version of the Ohsawa-Takegoshi extension theorem for holomorphic jets ([\textit{T. Ohsawa} and \textit{K. Takegoshi}, Math. Z. 195, 197--204 (1987; Zbl 0625.32011)]).