The scope of this paper is to prove a Poincaré type inequality for a family of non linear vector fields, whose coefficients are only Lipschitz continuous with respect to the distance induced by the vector fields themselves
We prove the Poincaré inequality for vector fields on the balls of the control distance by integrati...
AbstractLet f be a Lipschitz operator from a path-connected set D⊆Cm into Cm, with the lub-Lipschitz...
We study families of holomorphic vector fields, holomorphically depending on parameters,in a neighbo...
The scope of this paper is to prove a Poincaré type inequality for a family of non linear vector fi...
Abstract. Scope of this paper is to prove a Poincare ́ type inequality for a family of non linear ve...
We provide a Poincarè inequality for families of Lipschitz continuous vector fields satisfying a H...
We provide a structure theorem for Carnot--Caratéodory balls defined by a family of Lipschitz cont...
We consider a family of vector fields Xi = Sigma(p)(j=1)b(ij) (x)partial derivative(xj) (i = 1, 2, ....
We present Lipschitz continuity estimates for a class of convex functions with respect to Hörmander ...
Given a family of vector fields we introduce a notion of convexity and of semiconvexity of a functio...
We prove a Lipschitz extension lemma in which the extension procedure simultaneously preserves the L...
We obtain (weighted) Poincaré type inequalities for vector fields satisfying the Hörmander condition...
Any continuous linear operator T: Lp → Lq has a natural vector‐valued extension T: Lp(l rn) → Lq(l r...
In this paper we discuss the convergence of distances associated to converging structures of Lipschi...
Let be a Hölder conjugate pair of vector fields, both belonging to the space . Suppose that d...
We prove the Poincaré inequality for vector fields on the balls of the control distance by integrati...
AbstractLet f be a Lipschitz operator from a path-connected set D⊆Cm into Cm, with the lub-Lipschitz...
We study families of holomorphic vector fields, holomorphically depending on parameters,in a neighbo...
The scope of this paper is to prove a Poincaré type inequality for a family of non linear vector fi...
Abstract. Scope of this paper is to prove a Poincare ́ type inequality for a family of non linear ve...
We provide a Poincarè inequality for families of Lipschitz continuous vector fields satisfying a H...
We provide a structure theorem for Carnot--Caratéodory balls defined by a family of Lipschitz cont...
We consider a family of vector fields Xi = Sigma(p)(j=1)b(ij) (x)partial derivative(xj) (i = 1, 2, ....
We present Lipschitz continuity estimates for a class of convex functions with respect to Hörmander ...
Given a family of vector fields we introduce a notion of convexity and of semiconvexity of a functio...
We prove a Lipschitz extension lemma in which the extension procedure simultaneously preserves the L...
We obtain (weighted) Poincaré type inequalities for vector fields satisfying the Hörmander condition...
Any continuous linear operator T: Lp → Lq has a natural vector‐valued extension T: Lp(l rn) → Lq(l r...
In this paper we discuss the convergence of distances associated to converging structures of Lipschi...
Let be a Hölder conjugate pair of vector fields, both belonging to the space . Suppose that d...
We prove the Poincaré inequality for vector fields on the balls of the control distance by integrati...
AbstractLet f be a Lipschitz operator from a path-connected set D⊆Cm into Cm, with the lub-Lipschitz...
We study families of holomorphic vector fields, holomorphically depending on parameters,in a neighbo...
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