Analytic bundle structure on the idempotent manifold

Abstract

Let X be a (real or complex) Banach space, and I(X) be the set of all (non-zero and non-identity) idempotents; i.e., bounded linear operators on X whose squares equal themselves. We show that the Banach submanifold I(X) of L(X) is a locally trivial analytic affine-Banach bundle over the Grassmann manifold G(X), via the map that sends Q∈ I(X) to Q(X), such that the affine-Banach space structure on each fiber is the one induced from L(X) (in particular, every fiber is an affine-Banach subspace of L(X)). Using this, we show that if K is a real Hilbert space, then the assignment (E,T) T* PE + PE, where E∈ G(K) and T∈ L(E,E), induces a bi-analytic bijection from the total space of the tangent bundle, T(G(K)), of G(K) onto I(K) (here, E is the orthogonal complement of E, PE∈ L(K) is the orthogonal projection onto E, and T* is the adjoint of T). Notice that this bi-analytic bijection is an affine map on each tangent plane.