On the second mixed moment of the characteristic polynomials of the 1D band matrices
Abstract
We consider the asymptotic behavior of the second mixed moment of the characteristic polynomials of the 1D Gaussian band matrices, i.e. of the hermitian matrices
H
n
with independent Gaussian entries such that
<
H
ij
H
lk
>=
δ
ik
δ
jl
J
ij
, where
J=(−
W
2
△+1
)
−1
. Assuming that
W
2
=
n
1+θ
,
0<θ<1
, we show that this asymptotic behavior (as
n→∞
) in the bulk of the spectrum coincides with those for the Gaussian Unitary Ensemble.