Add to ORKGM = smooth or analytic manifold V = distribution on M (subbundle of T (M), smooth or analytic) g = inner product on V, smooth or analytic A submanifold N ⊂M is horizontal if ∀p ∈ N Tp(N) ⊂ Vp. • Must think that moving along non-horizontal directions is forbidden. Analog
We examine the existence of tangent hyperplanes to subriemannian balls. Strictly abnormal shortest p...
There is a dual program linked with every nonlinear program. The dual objective function is called t...
We consider a Riemannian manifold $(\mathcal M,g)$ and a codimension one distribution $\Delta\subset...
We generalize the concept of sub-Riemannian geometry to infinite- dimensional manifolds modeled on c...
We discuss a new sufficient condition - weaker than the usual transversality condition - for the int...
Abstract. Let k be a positive integer and letm be the dimension of the horizontal subspace of a stra...
In this talk we will present an overview of some recent results on α-harmonic maps which are horizon...
We consider the principal configurations associated to smooth vector fields nu normal to a manifold ...
We consider the nilpotent sub-Riemannian problem with growth vector (2, 3, 5, 8). We describe and st...
A sub-Riemannian manifold is a smooth manifold which carries a distribution equipped with a metric. ...
The Casorati curvature of a submanifold Mn of a Riemannian manifold Mn+m is known to be the normaliz...
AbstractWe define an affine submersion with horizontal distribution and obtain some fundamental equa...
We study anti-invariant and Lagrangian submersions from trans-Sasakian manifolds onto Riemannian ma...
International audienceWe study trajectories of sub-Riemannian (also called horizontal) gradient of p...
We examine the existence of tangent hyperplanes to subriemannian balls. Strictly abnormal shortest p...
We examine the existence of tangent hyperplanes to subriemannian balls. Strictly abnormal shortest p...
There is a dual program linked with every nonlinear program. The dual objective function is called t...
We consider a Riemannian manifold $(\mathcal M,g)$ and a codimension one distribution $\Delta\subset...
We generalize the concept of sub-Riemannian geometry to infinite- dimensional manifolds modeled on c...
We discuss a new sufficient condition - weaker than the usual transversality condition - for the int...
Abstract. Let k be a positive integer and letm be the dimension of the horizontal subspace of a stra...
In this talk we will present an overview of some recent results on α-harmonic maps which are horizon...
We consider the principal configurations associated to smooth vector fields nu normal to a manifold ...
We consider the nilpotent sub-Riemannian problem with growth vector (2, 3, 5, 8). We describe and st...
A sub-Riemannian manifold is a smooth manifold which carries a distribution equipped with a metric. ...
The Casorati curvature of a submanifold Mn of a Riemannian manifold Mn+m is known to be the normaliz...
AbstractWe define an affine submersion with horizontal distribution and obtain some fundamental equa...
We study anti-invariant and Lagrangian submersions from trans-Sasakian manifolds onto Riemannian ma...
International audienceWe study trajectories of sub-Riemannian (also called horizontal) gradient of p...
We examine the existence of tangent hyperplanes to subriemannian balls. Strictly abnormal shortest p...
We examine the existence of tangent hyperplanes to subriemannian balls. Strictly abnormal shortest p...
There is a dual program linked with every nonlinear program. The dual objective function is called t...
We consider a Riemannian manifold $(\mathcal M,g)$ and a codimension one distribution $\Delta\subset...