Assuming a subelliptic a-priori estimate we prove global analytic regularity for non-linear second order operators on a product of tori, using the method of majorant series
In this paper we consider the problem of global analytic and Gevrey hypoellipticity and solvability ...
We study global regularity properties of invariant measures associated with second order differentia...
We study maximal regularity in interpolation spaces for the sum of three closed linear operators on ...
We consider non-linear operators constructed from rigid vector fields. In particular, we study (glob...
AbstractWe prove Gevrey regularity for a class of operators defined on the torus Tm+n, with real ana...
We study $\omega$-regularity of the solutions of certain operators that are globally $C^\infty$-hypo...
AbstractIn this paper we present a necessary and sufficient condition for a family of sums of square...
O objetivo principal deste trabalho é o estudo da regularidade anallítica global de certos operadore...
AbstractA theory of global regularity of the ∂¯-Neumann operator is developed which unifies the two ...
We study global regularity properties of invariant measures associated with second order differentia...
In this paper we study global C ∞ and Gevrey solvability for a class of sublaplacian defined on the ...
AbstractWe study global regularity properties of invariant measures associated with second order dif...
We consider here operators which are sum of (possibly) fractional derivatives, with (possibly differ...
Let G be a Lie group of polynomial volume growth, with Lie algebra g. Consider a second-order, right...
We consider real analytic involutive structures V, of co-rank one, defined on a real analytic paraco...
In this paper we consider the problem of global analytic and Gevrey hypoellipticity and solvability ...
We study global regularity properties of invariant measures associated with second order differentia...
We study maximal regularity in interpolation spaces for the sum of three closed linear operators on ...
We consider non-linear operators constructed from rigid vector fields. In particular, we study (glob...
AbstractWe prove Gevrey regularity for a class of operators defined on the torus Tm+n, with real ana...
We study $\omega$-regularity of the solutions of certain operators that are globally $C^\infty$-hypo...
AbstractIn this paper we present a necessary and sufficient condition for a family of sums of square...
O objetivo principal deste trabalho é o estudo da regularidade anallítica global de certos operadore...
AbstractA theory of global regularity of the ∂¯-Neumann operator is developed which unifies the two ...
We study global regularity properties of invariant measures associated with second order differentia...
In this paper we study global C ∞ and Gevrey solvability for a class of sublaplacian defined on the ...
AbstractWe study global regularity properties of invariant measures associated with second order dif...
We consider here operators which are sum of (possibly) fractional derivatives, with (possibly differ...
Let G be a Lie group of polynomial volume growth, with Lie algebra g. Consider a second-order, right...
We consider real analytic involutive structures V, of co-rank one, defined on a real analytic paraco...
In this paper we consider the problem of global analytic and Gevrey hypoellipticity and solvability ...
We study global regularity properties of invariant measures associated with second order differentia...
We study maximal regularity in interpolation spaces for the sum of three closed linear operators on ...
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