Algebraic quantum groups and duality I

Abstract

Let (A,) be a finite-dimensional Hopf algebra. The linear dual B of A is again a finite-dimensional Hopf algebra. The duality is given by an element V∈ B A, defined by V,a b= a,b where a∈ A and b∈ B. We use \,·\, , \,·\, for the pairings. In the introduction of this paper, we recall the various properties of this element V as sitting in the algebra B A. More generally, we can consider an algebraic quantum group (A,). We use the term here for a regular multiplier Hopf algebra with integrals. For B we now take the dual A of A. It is again an algebraic quantum group. In this case, the duality gives rise to an element V in the multiplier algebra M(B A). Still, most of the properties of V in the finite-dimensional case are true in this more general setting. The focus in this paper lies on various aspects of the duality between A and its dual A. Among other things we include a number of formulas relating the objects associated with an algebraic quantum group and its dual. This note is meant to give a comprehensive, yet concise (and sometimes simpler) account of these known results. This is part I of a series of three papers on this subject. The case of a multiplier Hopf *-algebra with positive integrals is treated in detail in part II and part III.