We show that, for all nonnegative integers k, Г, m and n, theYamabe invariant of
#k(RP3)#Г(RP2 】 S1)#m(S2 】 S1)#n(S2. 】S1)
is equal to the Yamabe invariant of RP3, provided k + Г ∶ 1. We then complete the classification (started by Bray and the second
author) of all closed 3-manifolds with Yamabe invariant greater than that of RP3. More precisely, we show that such manifolds
are either S3 or finite connected sums #m(S2 】 S1)#n(S2. 】S1),where S2. 】S1 is the nonorientable S2-bundle over S1.
A key ingredient is Aubin’s Lemma [3], which says that if the Yamabe constant is positive, then it is strictly less than the Yam-
abe constant of any of its non-trivial finite conformal coverings. This lemma, combined with inverse mean curvature flow and with
analysis of the Green’s function for the conformal Laplacians on specific finite and normal infinite Riemannian coverings, will allow us to construct a family of nice test functions on the finite coverings and thus prove the desired result.