A measure,
μ
\mu
, on
(
0
,
1
)
2
(0,1)^2
is said to be
D
4
D_4
-invariant if its value for any Borel set is invariant with respect to the symmetries of the unit square. A function,
κ
\kappa
, generated in a certain way by a measure,
μ
\mu
, on
(
0
,
1
)
2
(0,1)^2
is shown to be a measure of concordance if and only if the generating measure is positive, regular,
D
4
D_4
-invariant, and satisfies certain inequalities. The construction examined here includes Blomqvist’s beta as a special case.