Operators which preserve a positive definite inner product

Abstract: Let H be a Hilbert space, A a positive definite operator in H and f, g A = Af, g , f, g ∈ H, the A-inner product. This paper studies the geometry of the set It is proved that I aA is a submanifold of the Banach algebra of adjointable operators, and a homogeneous space of the group of invertible operators in H, which are unitaries for the A-inner product. Smooth curves in I a A with given initial conditions, which are minimal for the metric induced by , A , are presented. This result depends on an adaptation of… Show more