We reformulate notions from the theory of quasi-Poisson g-manifolds in terms of graded Poisson geometry and graded Poisson-Lie groups and prove that quasi-Poisson g-manifolds integrate to quasi-Hamiltonian g-groupoids. We then interpret this result within the theory of Dirac morphisms and multiplicative Manin pairs, to connect our work with more traditional approaches, and also to put it into a wider context suggesting possible generalizations
Given a Lie groupoid G over a manifold M, we show that multiplicative 2-forms on G relatively closed...
We show how generalized complex structures may be viewed locally as holomorphic Poisson structures, ...
This thesis is devoted to the study of holomorphic Poisson structures and Lie algebroids, and their ...
Abstract. We reformulate notions from the theory of quasi-Poisson g-manifolds in terms of graded Poi...
We propose a definition of Poisson quasi-Nijenhuis Lie algebroids as a natural generalization of Poi...
Lie theory for the integration of Lie algebroids to Lie groupoids, on the one hand, and of Poisson m...
In order to construct an integrable system on the moduli space Hom(pi(1) (S), G)/G of a punctured sp...
AbstractWe study the relationship between general dynamical Poisson groupoids and Lie quasi-bialgebr...
Let $\Sigma $ be a compact connected and oriented surface with nonempty boundary and let $G$ be a Li...
A Poisson structure on a homogeneous space of a Poisson groupoid is homogeneous if the action of the...
We discuss recent results extending the notions of hamiltonian action and reduction in symplectic ge...
This thesis is divided into four chapters. The first chapter discusses the relationship between stac...
Lie groupoids with Morita equivalence are a convenient model for the study of singular manifolds. Th...
Motivated by questions from quantum group and field theories, we review struc-tures on manifolds tha...
We study a large class of Poisson manifolds, derived from Manin triples, for which we construct expl...
Given a Lie groupoid G over a manifold M, we show that multiplicative 2-forms on G relatively closed...
We show how generalized complex structures may be viewed locally as holomorphic Poisson structures, ...
This thesis is devoted to the study of holomorphic Poisson structures and Lie algebroids, and their ...
Abstract. We reformulate notions from the theory of quasi-Poisson g-manifolds in terms of graded Poi...
We propose a definition of Poisson quasi-Nijenhuis Lie algebroids as a natural generalization of Poi...
Lie theory for the integration of Lie algebroids to Lie groupoids, on the one hand, and of Poisson m...
In order to construct an integrable system on the moduli space Hom(pi(1) (S), G)/G of a punctured sp...
AbstractWe study the relationship between general dynamical Poisson groupoids and Lie quasi-bialgebr...
Let $\Sigma $ be a compact connected and oriented surface with nonempty boundary and let $G$ be a Li...
A Poisson structure on a homogeneous space of a Poisson groupoid is homogeneous if the action of the...
We discuss recent results extending the notions of hamiltonian action and reduction in symplectic ge...
This thesis is divided into four chapters. The first chapter discusses the relationship between stac...
Lie groupoids with Morita equivalence are a convenient model for the study of singular manifolds. Th...
Motivated by questions from quantum group and field theories, we review struc-tures on manifolds tha...
We study a large class of Poisson manifolds, derived from Manin triples, for which we construct expl...
Given a Lie groupoid G over a manifold M, we show that multiplicative 2-forms on G relatively closed...
We show how generalized complex structures may be viewed locally as holomorphic Poisson structures, ...
This thesis is devoted to the study of holomorphic Poisson structures and Lie algebroids, and their ...