Add to ORKGAbstract. We compare the Grushin geometry to Euclidean geome-try, through quasisymmetric parametrization, bilipschitz parametriza-tion and bilipschitz embedding, highlighting the role of the exponents and the fractal nature of the singular hyperplanes in Grushin geometry. Consider in Rn a system of diagonal vector fields Xj = λj(x
According to singularity theory, many functions admit (local) normal forms under suitable equivalenc...
According to singularity theory, many functions admit (local) normal forms under suitable equivalenc...
AbstractWe introduce a blowing-up of singularities of vector fields associated with Newton Polyhedra...
Given $\alpha>0$, the $\alpha$-Grushin plane is $\mathbb{R}^2$ equipped with the sub-Riemannian metr...
Abstract. We demonstrate that the complex plane and a class of generalized Grushin planes G r , wher...
Given $\alpha>0$, the $\alpha$-Grushin plane is $\mathbb{R}^2$ equipped with the sub-Riemannian metr...
The Grushin plane is a right quotient of the Heisenberg group. Heisenberg geodesics ’ projections ar...
Geodesic in the Heisenberg groups are shown to arise from a isoperimetric problem in the Grushin pla...
The book is an innovative modern exposition of geometry, or rather, of geometries; it is the first t...
none2Geodesic in the Heisenberg groups are shown to arise from a isoperimetric problem in the Grushi...
AbstractThe Grushin plane is a right quotient of the Heisenberg group. Heisenberg geodesics' project...
AbstractThe nonlinear field equations often arising in geometrodynamical theories of matter generall...
The aim of this thesis is to explore the fields of sub-Riemannian and metric geometry. We comput...
A “vector ” in 3D computer graphics is commonly under-stood as a triplet of three floating point num...
We show that the extremal polygonal quasiconformal mappings are biLipschitz with respect to the hype...
According to singularity theory, many functions admit (local) normal forms under suitable equivalenc...
According to singularity theory, many functions admit (local) normal forms under suitable equivalenc...
AbstractWe introduce a blowing-up of singularities of vector fields associated with Newton Polyhedra...
Given $\alpha>0$, the $\alpha$-Grushin plane is $\mathbb{R}^2$ equipped with the sub-Riemannian metr...
Abstract. We demonstrate that the complex plane and a class of generalized Grushin planes G r , wher...
Given $\alpha>0$, the $\alpha$-Grushin plane is $\mathbb{R}^2$ equipped with the sub-Riemannian metr...
The Grushin plane is a right quotient of the Heisenberg group. Heisenberg geodesics ’ projections ar...
Geodesic in the Heisenberg groups are shown to arise from a isoperimetric problem in the Grushin pla...
The book is an innovative modern exposition of geometry, or rather, of geometries; it is the first t...
none2Geodesic in the Heisenberg groups are shown to arise from a isoperimetric problem in the Grushi...
AbstractThe Grushin plane is a right quotient of the Heisenberg group. Heisenberg geodesics' project...
AbstractThe nonlinear field equations often arising in geometrodynamical theories of matter generall...
The aim of this thesis is to explore the fields of sub-Riemannian and metric geometry. We comput...
A “vector ” in 3D computer graphics is commonly under-stood as a triplet of three floating point num...
We show that the extremal polygonal quasiconformal mappings are biLipschitz with respect to the hype...
According to singularity theory, many functions admit (local) normal forms under suitable equivalenc...
According to singularity theory, many functions admit (local) normal forms under suitable equivalenc...
AbstractWe introduce a blowing-up of singularities of vector fields associated with Newton Polyhedra...