International audienceIn this paper, we consider the action of Vect($S^1$) by Lie derivative on the spaces of pseudodifferential operators $Ψ\mathcal{DO}$. We study the $h$-trivial deformations of the standard embedding of the Lie algebra Vect(S1) of smooth vector fields on the circle, into the Lie algebra of functions on the cotangent bundle $T * S^1$. We classify the deformations of this action that become trivial once restricted to $h$, where $h=aff(1)$ or $si(2)$. Necessary and sufficient conditions for integrability of infinitesimal deformations are given
International audienceIn order to study the deformations of foliations of codimension 1 of a smooth ...
Pseudodifferential operators are formal Laurent series in the formal inverse ∂−1 of the derivative o...
Given a (smooth) action φ of a Lie group G on 'R POT.D' we construct a differential graded algebra ...
International audienceIn this paper, we consider the action of Vect($S^1$) by Lie derivative on the ...
On considère la structure du Vect(R)-module sur les espaces des opérateurs différentiels bilinéaires...
We split the algebra of pseudodifferential operators in two different ways into the direct sum of tw...
In the algebra PsΔ of pseudodifference operators, we consider two deformations of the Lie subalgebra...
Abstract. For the Lie algebras L\(H(2)) and L\(W(2)), we study their in-finitesimal deformations and...
Abstract. In [17, 19], Melrose has studied examples of non-compact mani-folds M0 whose large scale g...
We investigate deformations of the infinite-dimensional vector-field Lie algebra spanned by the fiel...
AbstractWe consider the integrability problem for Lie algebras of (generally unbounded) operators in...
Abstract. We define and study an algebra Ψ∞1,0,V (M0) of pseudodifferential operators canonically as...
We investigate deformations of the infinite dimensional vector field Lie algebra spanned by the fiel...
In this paper, a bisingular pseudodifferential calculus, along the lines of the oneintroduced by L. ...
Abstract. A multiplicatively closed, horizontal foliation on a Lie groupoid may be viewed as a ‘pseu...
International audienceIn order to study the deformations of foliations of codimension 1 of a smooth ...
Pseudodifferential operators are formal Laurent series in the formal inverse ∂−1 of the derivative o...
Given a (smooth) action φ of a Lie group G on 'R POT.D' we construct a differential graded algebra ...
International audienceIn this paper, we consider the action of Vect($S^1$) by Lie derivative on the ...
On considère la structure du Vect(R)-module sur les espaces des opérateurs différentiels bilinéaires...
We split the algebra of pseudodifferential operators in two different ways into the direct sum of tw...
In the algebra PsΔ of pseudodifference operators, we consider two deformations of the Lie subalgebra...
Abstract. For the Lie algebras L\(H(2)) and L\(W(2)), we study their in-finitesimal deformations and...
Abstract. In [17, 19], Melrose has studied examples of non-compact mani-folds M0 whose large scale g...
We investigate deformations of the infinite-dimensional vector-field Lie algebra spanned by the fiel...
AbstractWe consider the integrability problem for Lie algebras of (generally unbounded) operators in...
Abstract. We define and study an algebra Ψ∞1,0,V (M0) of pseudodifferential operators canonically as...
We investigate deformations of the infinite dimensional vector field Lie algebra spanned by the fiel...
In this paper, a bisingular pseudodifferential calculus, along the lines of the oneintroduced by L. ...
Abstract. A multiplicatively closed, horizontal foliation on a Lie groupoid may be viewed as a ‘pseu...
International audienceIn order to study the deformations of foliations of codimension 1 of a smooth ...
Pseudodifferential operators are formal Laurent series in the formal inverse ∂−1 of the derivative o...
Given a (smooth) action φ of a Lie group G on 'R POT.D' we construct a differential graded algebra ...