Closedness of the tangent spaces to the orbits of proper actions

Abstract

In this note we show that for any proper action of a Banach--Lie group G on a Banach manifold M, the corresponding tangent maps Tx(M) have closed range for each x ∈ M, i.e., the tangent spaces of the orbits are closed. As a consequence, for each free proper action on a Hilbert manifold, the quotient M/G carries a natural manifold structure.