Add to ORKGIn this paper we study intrinsic regular submanifolds of $mathbb{H}^n$, of low co-dimension in relation with the regularity of their intrinsic parametrization. We extend some results proved for one co-dimensional $mathbb{H}$-regular surfaces, characterizing uniformly intrinsic differentiable functions $phi$ acting between two complementary subgroups of the Heisenberg group $mathbb{H}^n$, with target space horizontal of dimension $k$, with $1 leq k leq n$, in terms of the Euclidean regularity of its components with respect to a family of non linear vector fields $ abla^{phi_j}$. Moreover, we show how the area of the intrinsic graph of $phi$ can be computed through the component of the matrix identifying the intrinsic differential of $phi$
We prove that, in general, H-regular surfaces in the Heisenberg group H1 are not bi-Lipschitz equiva...
We prove that, in general, H-regular surfaces in the Heisenberg group H1 are not bi-Lipschitz equiva...
The book is devoted to the study of submanifolds in the setting of Carnot groups equipped with a sub...
In this paper we study intrinsic regular submanifolds of $mathbb{H}^n$, of low co-dimension in relat...
In this paper we study intrinsic regular submanifolds of \(\mathbf{H}^n\) of low codimension in rela...
The thesis mainly concerns the study of intrinsically regular submanifolds of low codimension in the...
In the first Heisenberg group, we show that the intersection of two intrinsicsubmanifolds with linea...
AbstractWe describe intrinsically regular submanifolds in Heisenberg groups Hn. Low dimensional and ...
In the first Heisenberg group, we show that the intersection of two intrinsicsubmanifolds with linea...
We establish an area formula for the spherical measure of intrinsically regular submanifolds of low ...
We establish an area formula for the spherical measure of intrinsically regular submanifolds of low ...
AbstractIn the first Heisenberg group, we show that the intersection of two intrinsic submanifolds w...
AbstractWe describe intrinsically regular submanifolds in Heisenberg groups Hn. Low dimensional and ...
We prove that, in general, H-regular surfaces in the Heisenberg group H1 are not bi-Lipschitz equiva...
We prove that, in general, H-regular surfaces in the Heisenberg group H^1 are not bi-Lipschitz equiv...
We prove that, in general, H-regular surfaces in the Heisenberg group H1 are not bi-Lipschitz equiva...
We prove that, in general, H-regular surfaces in the Heisenberg group H1 are not bi-Lipschitz equiva...
The book is devoted to the study of submanifolds in the setting of Carnot groups equipped with a sub...
In this paper we study intrinsic regular submanifolds of $mathbb{H}^n$, of low co-dimension in relat...
In this paper we study intrinsic regular submanifolds of \(\mathbf{H}^n\) of low codimension in rela...
The thesis mainly concerns the study of intrinsically regular submanifolds of low codimension in the...
In the first Heisenberg group, we show that the intersection of two intrinsicsubmanifolds with linea...
AbstractWe describe intrinsically regular submanifolds in Heisenberg groups Hn. Low dimensional and ...
In the first Heisenberg group, we show that the intersection of two intrinsicsubmanifolds with linea...
We establish an area formula for the spherical measure of intrinsically regular submanifolds of low ...
We establish an area formula for the spherical measure of intrinsically regular submanifolds of low ...
AbstractIn the first Heisenberg group, we show that the intersection of two intrinsic submanifolds w...
AbstractWe describe intrinsically regular submanifolds in Heisenberg groups Hn. Low dimensional and ...
We prove that, in general, H-regular surfaces in the Heisenberg group H1 are not bi-Lipschitz equiva...
We prove that, in general, H-regular surfaces in the Heisenberg group H^1 are not bi-Lipschitz equiv...
We prove that, in general, H-regular surfaces in the Heisenberg group H1 are not bi-Lipschitz equiva...
We prove that, in general, H-regular surfaces in the Heisenberg group H1 are not bi-Lipschitz equiva...
The book is devoted to the study of submanifolds in the setting of Carnot groups equipped with a sub...