Codifferential Calculi on Quantum Homogeneous Spaces

Abstract

We develop the theory of first- and higher-order codifferential calculi over coalgebras C over fields k with characteristic char(k)≠ 2. For a given first-order codifferential calculus, we introduce its maximal prolongation by means of an explicit construction that associates to it a differential graded coalgebra, satisfying a universal property. For module coalgebras over a Hopf algebra U, we introduce the notion of an equivariant codifferential calculus. If C is of the form UH k for a Hopf algebra U and a right coideal subalgebra H such that U is faithfully flat as a left- and right H-module, we show that equivariant first-order codifferential calculi correspond to certain right coideals T⊂eq ( C→ k) called quantum tangent spaces. If H is a sub bialgebra and the right C-coaction on T is trivial, then the maximal prolongation is described in terms of a quadratic coalgebra. We further relate codifferential calculi to differential calculi and Cartan pairs over the dual algebra C, or more generally subalgebras thereof. We explicitly compute codifferential calculi on the coalgebra pre duals of the Podleś sphere and the quantized projective spaces. As an application, we give a new proof that the antiholomorphic Heckenberger--Kolb calculi on quantized projective spaces have classical dimension.