INFINITELY MANY SOLUTIONS TO THE YAMABE PROBLEM ON NONCOMPACT MANIFOLDS

We establish the existence of infinitely many complete metrics with constant scalar curvature in conformal classes of certain noncompact product manifolds. These include products of closed manifolds with constant positive scalar curvature and simply-connected symmetric spaces of noncompact or Eu-clidean type; in particular, S-m x R-d, m >= 2, d >= 1, and S-m x H-d, 2 <= d < m. As a consequence, we obtain infinitely many periodic solutions to the singular Yamabe problem on S-m \ S-k, for all 0 <= k < ( m - 2)/2, the maximal range where nonuniqueness is possible. We also show that all Bieberbach groups in Iso(R-d) are periods of bifurcating branches of solutions to the Yamabe problem on S-m x R-d, m >= 2, d >= 1.