Maulik-Okounkov quantum loop groups and Drinfeld double of preprojective K-theoretic Hall algebras
Abstract
In this paper we prove the following results: Given the Drinfeld double AextQ of the localised preprojective K-theoretic Hall algebra A+Q of quiver type Q with the Cartan elements, there is a Q(q,te)e∈ E-Hopf algebra isomorphism between AextQ and the localised Maulik-Okounkov quantum loop group UMOq(gQ) of quiver type Q. Moreover, we prove the isomorphism of Z[q1,te1]e∈ E-algebras between the positive/negative half of the integral Maulik-Okounkov quantum loop group UqMO,,Z(gQ) with the (opposite) algebra of the integral preprojective (nilpotent) K-theoretic Hall algebra A+,ZQ ((A+,nilp,ZQ)op) of the same quiver type Q. As the application, we prove that one can identify the wall subalgebra UqMO,Z(gw) as the root subalgebra Bm,wZ in the slope subalgebra BmZ as the quasitriangular Hopf Z[q1,te1]e∈ E-algebras. Moreover we use the freeness of the wall subalgebra in MO quantum loop groups to prove the freeness of the preprojective K-theoretic Hall algebra for arbitrary torus Cq*⊂ A⊂ T.
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