The notion of the Cousin complex of a module was given by Sharp in 1969. It wasn’t known whether its cohomologies are finitely generated until recently. In 2001, Dibaei and Tousi showed that the Cousin cohomologies of a finitely generated
A
A
-module
M
M
are finitely generated if the base ring
A
A
is local, has a dualizing complex,
M
M
satisfies Serre’s
(
S
2
)
(S_2)
-condition and is equidimensional. In the present article, the author improves their result. He shows that the Cousin cohomologies of
M
M
are finitely generated if
A
A
is universally catenary, all the formal fibers of all the localizations of
A
A
are Cohen-Macaulay, the Cohen-Macaulay locus of each finitely generated
A
A
-algebra is open and all the localizations of
M
M
are equidimensional. As a consequence of this, he gives a necessary and sufficient condition for a Noetherian ring to have an arithmetic Macaulayfication.