Local scattering matrix for a degenerate avoided-crossing in the non-coupled regime

Abstract

A Landau-Zener type formula for a degenerate avoided-crossing is studied in the non-coupled regime. More precisely, a 2×2 system of first order h-differential operator with O() off-diagonal part is considered in 1D. Asymptotic behavior as hm/(m+1)0+ of the local scattering matrix near an avoided-crossing is given, where m stands for the contact order of two curves of the characteristic set. A generalization including the cases with vanishing off-diagonals and non-Hermitian symbols is also given.