Anick resolution for the free unitary quantum group

Abstract

A resolution P of the counit of the Hopf -algebra O(Un+) of representative functions on van Daele and Wang's free unitary quantum group Un+ in terms of free O(Un+)-modules is computed for arbitrary n. A different such resolution was recently found by Baraquin, Franz, Gerhold, Kula and Tobolski. While theirs has desirable properties which P lacks, P is still good enough to compute the (previously known) quantum group cohomology and comes instead with an important advantage: P can be arrived at without the clever combination of certain results potentially very particular to Un+ that enabled the aforementioned authors to find their resolution. Especially, P relies neither on the resolution for On+ obtained by Collins, H\"artel and Thom nor the one for SL2(q) found by Hadfield and Kr\"ahmer. Rather, as shown in the present article, the recursion defining the Anick resolution of the counit of O(Un+) can be solved in closed form. That suggests a potential strategy for determining the cohomologies of arbitrary easy quantum groups.