Pairing and duality of algebraic quantum groupoids

TL;DR

This paper explores the duality relationships between algebraic quantum groupoids, weak multiplier Hopf algebras, and multiplier Hopf algebroids, emphasizing the role of integrals and the connections between different duality approaches.

Contribution

It clarifies the relation between duality theories for weak multiplier Hopf algebras and multiplier Hopf algebroids, especially in the presence of integrals, and introduces a more general dual pair framework.

Findings

Dual of an algebraic quantum groupoid admits a dual of the same type.

Duality of regular multiplier Hopf algebroids with a single faithful integral is established.

Relation between duality approaches is further elucidated.

Abstract

Algebraic quantum groupoids have been developed by two of the authors (AVD and SHW) of this note in a series of papers. Regular multiplier Hopf algebroids are obtained also by two authors (TT and AVD). Integral theory and duality for those have been studied by one author here (TT). Finally, again two authors of us (TT and AVD) have investigated the relation between weak multiplier Hopf algebras and multiplier Hopf algebroids. In the paper 'Weak multiplier Hopf algebras III. Integrals and duality' (by AVD and SHW), one of the main results is that the dual of an algebraic quantum groupoid, admits a dual of the same type. In the paper 'On duality of algebraic quantum groupoids' (by TT), a result of the same nature is obtained for regular multiplier Hopf algebroids with a single faithful integral. The duality of regular weak multiplier Hopf algebras with a single integral can be obtained from the duality of regular multiplier Hopf algebroids. That is however not the obvious way to obtain this result. It is more difficult and less natural than the direct way. We will discuss this statement further in the paper. Nevertheless, it is interesting to investigate the relation between the two approaches to duality in greater detail. This is what we do in this paper. We build further on the intimate relation between weak multiplier Hopf algebras and multiplier Hopf algebroids. We now add the presence of integrals. That seems to be done best in a framework of dual pairs. It is in fact more general than the duality of these objects coming with integrals.