Add to ORKGThe sharp Gevrey hypoellipticity is provided for the following generalization of the M\'etivier operator, "Non-hypoellipticit\'e analytique pour $D_{x}^{2}+\left( x^{2} + y^{2}\right)D_{y}^{2}$" by G. M\'etivier, \begin{align*} D_{x}^{2}+\left(x^{2n+1}D_{y}\right)^{2}+\left(x^{n}y^{m}D_{y}\right)^{2}, \end{align*} in $\Omega$ open neighborhood of the origin in $\mathbb{R}^{2}$, where $n$ and $m$ are positive integers
Abstract The Gevrey hypoellipticity of a class of models generalizing the Oleĭnik–Radkevic operator ...
We consider an operator being a sum of squares of vector fields. It has the form, p,r∈N, P(x,Dx,Dy,D...
The Gevrey hypo-ellipticity of a couple of model operators is studied in detail. We match the obtain...
We prove a sharp Gevrey hypoellipticity for the operator D-x(2) + (x(2n+1)D(y))(2)+ (x(n)y(m)D(y))(2...
In J. J. Kohn’s recent paper [5] the operator ∂ ∂ − iz|z|2(m−1) ∂z ∂t was introduced and shown to be...
Treves, F., [15], proved the hypoellipticity of some regular operators. Later, Hörmander, L.,[11] Du...
summary:The problems of Gevrey hypoellipticity for a class of degenerated quasi-elliptic operators a...
In this paper we consider the analogue of Kohn's operator but with a point singularity, % $$ P=BB...
We study the hypoellipticity of (pseudo)differential operators in one variable when a positivity ass...
AbstractWe prove Gevrey regularity for a class of operators defined on the torus Tm+n, with real ana...
In this paper we consider sums of squares of vector fields in R ...
We prove a couple of results concerning pseudodifferential perturbations of differential operators b...
This paper deals with the Gevrey regularity of pseudo-differential operators in C**. We prove that a...
We prove hypoellipticity in the sense of germs for the operator \[ P ...
In this paper we consider sums of squares of vector fields in $\R^2$ satisfying H\"ormander's condi...
Abstract The Gevrey hypoellipticity of a class of models generalizing the Oleĭnik–Radkevic operator ...
We consider an operator being a sum of squares of vector fields. It has the form, p,r∈N, P(x,Dx,Dy,D...
The Gevrey hypo-ellipticity of a couple of model operators is studied in detail. We match the obtain...
We prove a sharp Gevrey hypoellipticity for the operator D-x(2) + (x(2n+1)D(y))(2)+ (x(n)y(m)D(y))(2...
In J. J. Kohn’s recent paper [5] the operator ∂ ∂ − iz|z|2(m−1) ∂z ∂t was introduced and shown to be...
Treves, F., [15], proved the hypoellipticity of some regular operators. Later, Hörmander, L.,[11] Du...
summary:The problems of Gevrey hypoellipticity for a class of degenerated quasi-elliptic operators a...
In this paper we consider the analogue of Kohn's operator but with a point singularity, % $$ P=BB...
We study the hypoellipticity of (pseudo)differential operators in one variable when a positivity ass...
AbstractWe prove Gevrey regularity for a class of operators defined on the torus Tm+n, with real ana...
In this paper we consider sums of squares of vector fields in R ...
We prove a couple of results concerning pseudodifferential perturbations of differential operators b...
This paper deals with the Gevrey regularity of pseudo-differential operators in C**. We prove that a...
We prove hypoellipticity in the sense of germs for the operator \[ P ...
In this paper we consider sums of squares of vector fields in $\R^2$ satisfying H\"ormander's condi...
Abstract The Gevrey hypoellipticity of a class of models generalizing the Oleĭnik–Radkevic operator ...
We consider an operator being a sum of squares of vector fields. It has the form, p,r∈N, P(x,Dx,Dy,D...
The Gevrey hypo-ellipticity of a couple of model operators is studied in detail. We match the obtain...