A generalized second main theorem for closed subschemes
Abstract
Let be closed subschemes which are located in -subgeneral position with index in a complex projective variety of dimension Let be an ample Cartier divisor on We obtain that if a holomorphic curve is Zariski-dense, then for every \begin{eqnarray*} \sum^{q}_{j=1}\epsilon_{Y_{j}}(A)m_{f}(r,Y_{j})\leq_{exc} \left(\frac{(\ell-n+\kappa)(n+1)}{\kappa}+\epsilon\right)T_{f,A}(r). \end{eqnarray*}This generalizes the second main theorems for general position case due to Heier-Levin [AM J. Math. 143(2021), no. 1, 213-226] and subgeneral position case due to He-Ru [J. Number Theory 229(2021), 125-141]. In particular, whenever all the are reduced to Cartier divisors, we also give a second main theorem with the distributive constant. The corresponding Schmidt's subspace theorem for closed subschemes in Diophantine approximation is also given.
Cite
@article{arxiv.2201.04284,
title = {A generalized second main theorem for closed subschemes},
author = {Liang Wang and Tingbin Cao and Hongzhe Cao},
journal= {arXiv preprint arXiv:2201.04284},
year = {2023}
}
Comments
17 pages. This is the final verion which is accepted and will appear in Annales Polonici Mathematici. arXiv admin note: text overlap with arXiv:1910.07966 by other authors