Leaf Space Isometries of Singular Riemannian Foliations and Their Spectral Properties

Abstract

In this paper, the authors consider leaf spaces of singular Riemannian foliations F on compact manifolds M and the associated F-basic spectrum on M, specB(M, F), counted with multiplicities. Recently, a notion of smooth isometry : M1/F1→ M2/F2 between the leaf spaces of such singular Riemannian foliations (M1,F1) and (M2,F2) has appeared in the literature. In this paper, the authors provide an example to show that the existence a smooth isometry of leaf spaces as above is not sufficient to guarantee the equality of specB(M1,F1) and specB(M2,F2). The authors then prove that if some additional conditions involving the geometry of the leaves are satisfied, then the equality of specB(M1,F1) and specB(M2,F2) is guaranteed. Consequences and applications to orbifold spectral theory, isometric group actions, and their reductions are also explored.