Enveloping algebra is a Yetter–Drinfeld module algebra over Hopf algebra of regular functions on the automorphism group of a Lie algebra

Abstract

We present an elementary construction of a (highly degenerate) Hopf pairing between the universal enveloping algebra U ⁢ ( 𝔤 ) of a finite-dimensional Lie algebra 𝔤 over arbitrary field 𝒌 , and the Hopf algebra 𝒪 ⁢ ( Aut ⁡ ( 𝔤 ) ) of regular functions on the automorphism group of 𝔤 . This pairing induces a Hopf action of 𝒪 ⁢ ( Aut ⁡ ( 𝔤 ) ) on U ⁢ ( 𝔤 ) , which, together with an explicitly given coaction, makes U ⁢ ( 𝔤 ) into a braided commutative Yetter–Drinfeld 𝒪 ⁢ ( Aut ⁡ ( 𝔤 ) ) -module algebra. From these data one constructs a Hopf algebroid structure on the smash product algebra ♯ ⁡ 𝒪 ⁢ ( Aut ⁡ ( 𝔤 ) ) U ⁢ ( 𝔤 ) , retaining essential features from earlier constructions of a Hopf algebroid structure on infinite-dimensional versions of the Heisenberg double of U ⁢ ( 𝔤 ) , including a noncommutative phase space of Lie algebra type, while avoiding the need of completed tensor products. We prove a slightly more general result, where the algebra 𝒪 ⁢ ( Aut ⁡ ( 𝔤 ) ) is replaced by 𝒪 ⁢ ( Aut ⁡ ( 𝔥 ) ) and where 𝔥 is any finite-dimensional Leibniz algebra having 𝔤 as its maximal Lie algebra quotient.