ar X iv : d g - ga / 9 60 50 07 v 1 1 9 M ay 1 99 6 Structure “ Hyper - Lie Poisson ” ∗

iv : d g - ga / 9 60 50 03 v 1 5 M ay 1 99 6 Flux homomorphism on symplectic groupoids ∗

For any Poisson manifold P , the Poisson bracket on C∞(P ) extends to a Lie bracket on the space Ω(P ) of all differential one-forms, under which the space Z(P ) of closed one-forms and the space B(P ) of exact one-forms are Lie subalgebras. These Lie algebras are related by the exact sequence: 0 −→ R −→ C∞(P ) d −→ Z(P ) f −→ H(P,R) −→ 0, where H(P,R) is considered as a trivial Lie algebra, an...

ar X iv : d g - ga / 9 51 20 10 v 2 2 4 M ay 1 99 6 Weierstrass representations for harmonic morphisms on Euclidean spaces and spheres

We construct large families of harmonic morphisms which are holomorphic with respect to Hermitian structures by finding heierarchies of Weierstrass-type representations. This enables us to find new examples of complex-valued harmonic mor-phisms from Euclidean spaces and spheres.

ar X iv : m at h / 99 05 08 0 v 1 [ m at h . Q A ] 1 2 M ay 1 99 9 Kontsevich star - product on the dual of a Lie algebra

We show that on the dual of a Lie algebra g of dimension d, the star-product recently introduced by M. Kontsevich is equivalent to the Gutt star-product on g *. We give an explicit expression for the operator realizing the equivalence between these star-products.

ar X iv : a lg - g eo m / 9 50 20 26 v 2 9 M ay 1 99 5 ALGEBRAIC SURFACES AND SEIBERG - WITTEN INVARIANTS

ar X iv : q - a lg / 9 70 50 12 v 1 1 6 M ay 1 99 7 Poisson structures on the center

It is shown that the elliptic algebra Aq,p(ŝl(2)c) has a non trivial center at the critical level c = −2, generalizing the result of Reshetikhin and Semenov-Tian-Shansky for trigonometric algebras. A family of Poisson structures indexed by a non-negative integer k is constructed on this center.