Add to ORKGWe give an integrability criterion for a projective limit of Banach distributions on a Fréchet manifold which is a projective limit of Banach manifolds. This leads to a result of integrability of projective limit of involutive bundles on a projective sequence of Banach manifolds. This can be seen as a version of Frobenius Theorem in Fréchet setting. As consequence, we obtain a version of the third Lie theorem for a Fréchet-Lie group which is a submersive projective limit of Banach Lie groups. We also give an application to a sequence of prolongations of a Banach Lie algebroid
In a previous article [11] we studied the central limit theorem for innitesimal triangular arrays of...
In this paper we prove, for signed or complex Radon measures on completely regular spaces, the analo...
Abstract. The paper deals with the problem of B. V. Gnedenko for the partial summation scheme of ran...
Many geometrical features of manifolds and fibre bundles modelled on Fréchet spaces either cannot be...
AbstractThis paper concerns the problem of integrability of non closed distributions on Banach manif...
A new approach to studying Fréchet geometry using projective limits of geometrical objects modelled ...
Anosov representations are representations of a hyperbolic group to a non-compact semisimple Lie gro...
We formulate a notion of (uniform) asymptotic involutivity and show that it implies (unique) integra...
AbstractIn this paper we show that the solution set of certain Volterra inclusions defined between F...
We introduce the notion of a projective hull for subsets of complex projective varieties parallel to...
AbstractA proof of the relative version of Frobenius theorem for a graded submersion, which includes...
In this paper we present the solution to a longstanding problem of dierential geometry Lies third th...
On a smooth manifold M, the vector bundle structures of the second order tangent bundle, T^2M biject...
AbstractWe present sampling theorems for reproducing kernel Banach spaces on Lie groups. Recent appr...
We formulate a notion of (uniform) asymptotic involutivity and show that it implies (unique) integ...
In a previous article [11] we studied the central limit theorem for innitesimal triangular arrays of...
In this paper we prove, for signed or complex Radon measures on completely regular spaces, the analo...
Abstract. The paper deals with the problem of B. V. Gnedenko for the partial summation scheme of ran...
Many geometrical features of manifolds and fibre bundles modelled on Fréchet spaces either cannot be...
AbstractThis paper concerns the problem of integrability of non closed distributions on Banach manif...
A new approach to studying Fréchet geometry using projective limits of geometrical objects modelled ...
Anosov representations are representations of a hyperbolic group to a non-compact semisimple Lie gro...
We formulate a notion of (uniform) asymptotic involutivity and show that it implies (unique) integra...
AbstractIn this paper we show that the solution set of certain Volterra inclusions defined between F...
We introduce the notion of a projective hull for subsets of complex projective varieties parallel to...
AbstractA proof of the relative version of Frobenius theorem for a graded submersion, which includes...
In this paper we present the solution to a longstanding problem of dierential geometry Lies third th...
On a smooth manifold M, the vector bundle structures of the second order tangent bundle, T^2M biject...
AbstractWe present sampling theorems for reproducing kernel Banach spaces on Lie groups. Recent appr...
We formulate a notion of (uniform) asymptotic involutivity and show that it implies (unique) integ...
In a previous article [11] we studied the central limit theorem for innitesimal triangular arrays of...
In this paper we prove, for signed or complex Radon measures on completely regular spaces, the analo...
Abstract. The paper deals with the problem of B. V. Gnedenko for the partial summation scheme of ran...