Generalizations of degeneracy second main theorem and Schmidt's subspace theorem

TL;DR

This paper advances Nevanlinna theory and Schmidt's subspace theorem by introducing a new concept called the 'distributive constant' and establishing generalized second main theorems for meromorphic mappings and hypersurfaces.

Contribution

It introduces the 'distributive constant' to generalize and improve second main theorems and Schmidt's subspace theorem for arbitrary families of hypersurfaces and polynomials.

Findings

Generalized second main theorem for meromorphic mappings with hypersurfaces

Proved a Schmidt's subspace theorem for arbitrary families of homogeneous polynomials

Extended results to holomorphic curves and meromorphic mappings on Kähler manifolds

Abstract

In this paper, by introducing the notion of "\textit{distributive constant}" of a family of hypersurfaces with respect to a projective variety, we prove a second main theorem in Nevanlinna theory for meromorphic mappings with arbitrary families of hypersurfaces in projective varieties. Our second main theorem generalizes and improves previous results for meromorphic mappings with hypersurfaces, in particular for algebraically degenerate mappings and for the families of hypersurfaces in subgeneral position. The analogous results for the holomorphic curves with finite growth index from a complex disc into a project variety, and for meromorphic mappings on a complete K\"{a}hler manifold are also given. For the last aim, we will prove a Schmidt's subspace theorem for an arbitrary families of homogeneous polynomials, which is the counterpart in Number theory of our second main theorem. Our these results are generalizations and improvements of all previous results.