Add to ORKGAn essential tool for researchers in differential geometry, devoted to the theory of harmonic vector fields on Riemannian, contact, CR, and Lorentzian manifolds. Although focused on the differential geometric properties of harmonic vector fields, this unique book carefully reports on interdisciplinary aspects, relating the subject to both nonlinear analysis (weak solutions to the harmonic vector fields equation) and analysis in several complex variables (subelliptic harmonic vector fields and tangential Cauchy-Riemann equations)
The study of CR manifolds lies at the intersection of three main mathematical disciplines: partial d...
A comprehensive text and reference on sub-Riemannian and Heisenberg manifolds using a novel and robu...
We study the natural almost CR structure on the total space of a subbundle of hyperquadrics of the t...
An essential tool for researchers in differential geometry, devoted to the theory of harmonic vector...
This dissertation investigates harmonic vector fields which are special mappings on Riemannian manif...
We review the salient properties of subelliptic harmonic maps and morphisms, both from a domain in &...
Sub-Riemannian geometry is geometry of the world with nonholonomic constraints. In such a world, one...
In this book, I present an expanded version of the contents of my lectures at a Seminar of the DMV (...
A contact Riemannian manifold whose Reeb vector field is harmonic is called H-contact manifold. The ...
We study harmonic vector fields on a Lorentzian torus $T^2$ i.e. critical points of the total bendin...
We study the natural almost CR structure on the total space of a subbundle of hyperquadrics of the t...
We seek to extend the applicability of the tools of complex analysis that have been developed to dea...
This established reference work continues to provide its readers with a gateway to some of the most ...
Sub-Riemannian geometry is geometry of the world with nonholonomic constraints. In such a world, one...
open2noFrom the introduction to the monograph: Students of scientific disciplines usually meet vec...
The study of CR manifolds lies at the intersection of three main mathematical disciplines: partial d...
A comprehensive text and reference on sub-Riemannian and Heisenberg manifolds using a novel and robu...
We study the natural almost CR structure on the total space of a subbundle of hyperquadrics of the t...
An essential tool for researchers in differential geometry, devoted to the theory of harmonic vector...
This dissertation investigates harmonic vector fields which are special mappings on Riemannian manif...
We review the salient properties of subelliptic harmonic maps and morphisms, both from a domain in &...
Sub-Riemannian geometry is geometry of the world with nonholonomic constraints. In such a world, one...
In this book, I present an expanded version of the contents of my lectures at a Seminar of the DMV (...
A contact Riemannian manifold whose Reeb vector field is harmonic is called H-contact manifold. The ...
We study harmonic vector fields on a Lorentzian torus $T^2$ i.e. critical points of the total bendin...
We study the natural almost CR structure on the total space of a subbundle of hyperquadrics of the t...
We seek to extend the applicability of the tools of complex analysis that have been developed to dea...
This established reference work continues to provide its readers with a gateway to some of the most ...
Sub-Riemannian geometry is geometry of the world with nonholonomic constraints. In such a world, one...
open2noFrom the introduction to the monograph: Students of scientific disciplines usually meet vec...
The study of CR manifolds lies at the intersection of three main mathematical disciplines: partial d...
A comprehensive text and reference on sub-Riemannian and Heisenberg manifolds using a novel and robu...
We study the natural almost CR structure on the total space of a subbundle of hyperquadrics of the t...