Non-Archimedean analytic curves in the complements of hypersurface divisors

Abstract

We study the degeneration dimension of non-archimedean analytic maps into the complement of hypersurface divisors of smooth projective varieties. We also show that there exist no non-archimedean analytic maps into Pni= 1n Di where Di, 1 i n, are hypersurfaces of degree at least 2 in general position and intersecting transversally. Moreover, we prove that there exist no non-archimedean analytic maps into P2i=12 Di when D1, D2 are generic plane curves with degD1+degD2 4.