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Abstract
The zero-divisor graph of a non-commutative ring R, written as , is a directed graph with vertex set of all non-zero zero-divisors of R, and there is a directed edge from a vertex x to a distinct vertex y if and only if
. Let M(n, q) (resp., T(n, q)) be the ring of all
matrices (resp., upper triangular matrices) over a finite field
. Recently, Wang (Linear Algebra Appl. 2015;465:214–220) determined the automorphisms of the zero-divisor graph of T(n, q). In this paper, we determine the automorphisms of
, extending the result due to L. Wang from T(n, q) to M(n, q). Since the
case is trivial, and the
case has been examined in Ma et al. (J. Korean Math. Soc. 2016;53:519–532), we just determine the automorphisms of
in the
case. We show that a bijective map
on
is an automorphism of
if and only if there exist invertible matrices
and a
such that
for any
, where
,
and
depend on A, and
.
Notes
No potential conflict of interest was reported by the authors.