Add to ORKGWe formulate a notion of (uniform) asymptotic involutivity and show that it implies (unique) integrability of corank-1 continuous distributions in dimensions three or less. This generalizes and extends a classical theorem of Frobenius Theorem which says that an involutive C^1 distribution is uniquely integrable
We give an integrability criterion for a projective limit of Banach distributions on a Fréchet manif...
We propose a definition of directional multivariate subexponential and convolution equivalent densit...
The phenomenon of superconvergence is proved for all freely infinitely divisible distributions. Prec...
We formulate a notion of (uniform) asymptotic involutivity and show that it implies (unique) integ...
We prove a Frobenius-type theorem for singular distributions generated by a family of locally Lipsch...
AbstractWe generalize the classical Frobenius Theorem to distributions that are spanned by locally L...
In this thesis, we explore the following question: what is the accessible set of a distribution H on...
Abstract. Given a system of s independent 1-forms on a smooth man-ifold M of dimension m, we study t...
If F is a continuous function on the real line and f=F′ is its distributional derivative, then the c...
We deal with random processes obtained from a homogeneous random process with independent increments...
AbstractA proof of the relative version of Frobenius theorem for a graded submersion, which includes...
In this paper we complete the theory of punctual and local integrability of smooth and analytic dist...
Using the notion of Levi form of a smooth distribution, we discuss the local and the global problem ...
International audienceWe review the properties of transversality of distributions with respect to su...
AbstractIn this paper we introduce and investigate the notion of uniformly integrable operators on L...
We give an integrability criterion for a projective limit of Banach distributions on a Fréchet manif...
We propose a definition of directional multivariate subexponential and convolution equivalent densit...
The phenomenon of superconvergence is proved for all freely infinitely divisible distributions. Prec...
We formulate a notion of (uniform) asymptotic involutivity and show that it implies (unique) integ...
We prove a Frobenius-type theorem for singular distributions generated by a family of locally Lipsch...
AbstractWe generalize the classical Frobenius Theorem to distributions that are spanned by locally L...
In this thesis, we explore the following question: what is the accessible set of a distribution H on...
Abstract. Given a system of s independent 1-forms on a smooth man-ifold M of dimension m, we study t...
If F is a continuous function on the real line and f=F′ is its distributional derivative, then the c...
We deal with random processes obtained from a homogeneous random process with independent increments...
AbstractA proof of the relative version of Frobenius theorem for a graded submersion, which includes...
In this paper we complete the theory of punctual and local integrability of smooth and analytic dist...
Using the notion of Levi form of a smooth distribution, we discuss the local and the global problem ...
International audienceWe review the properties of transversality of distributions with respect to su...
AbstractIn this paper we introduce and investigate the notion of uniformly integrable operators on L...
We give an integrability criterion for a projective limit of Banach distributions on a Fréchet manif...
We propose a definition of directional multivariate subexponential and convolution equivalent densit...
The phenomenon of superconvergence is proved for all freely infinitely divisible distributions. Prec...
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