Remarque sur la note de M. Floquet relative à l'intégration de l'équation d'Euler
Remarque sur une equation differentielle du premier ordre
Remarques sur les variétés conformément plates.
Remarques sur une classe générale de surfaces, et en particulier sur la surface lieu des points dont la somme des distances à deux droites fixes est constante
Reper sítě na ploše
Reper sítě na ploše v trojrozměrném afinním prostoru
Reperáž systému anholonomních subvariet trojrozměrné variety v pětirozměrném ekviafinním prostoru
Representation of curves of constant width in the hyperbolic plane.
Representations of hypersurfaces and minimal smoothness of the midsurface in the theory of shells
Representing Seashells Surface
Research works of Romanian mathematicians on centro-affine geometry.
Ricci and Casorati principal directions of Chen ideal submanifolds
Ricci identities in the space of non-symmetric affine connexion
Ricci type identities for non-basic differentiation in Otsuki spaces.
Ricci-semisymmetric hypersurfaces.
Rigidity of hypersurfaces in complex projective space
Rigidity of minimal hypersurfaces of spheres with constant Ricci curvature.
Robot-manipulators as submanifolds.
Robust a priori error analysis for the approximation of degree-one Ginzburg-Landau vortices
This article discusses the numerical approximation of time dependent Ginzburg-Landau equations. Optimal error estimates which are robust with respect to a large Ginzburg-Landau parameter are established for a semi-discrete in time and a fully discrete approximation scheme. The proofs rely on an asymptotic expansion of the exact solution and a stability result for degree-one Ginzburg-Landau vortices. The error bounds prove that degree-one vortices can be approximated robustly while unstable higher...
Robust a priori error analysis for the approximation of degree-one Ginzburg-Landau vortices
This article discusses the numerical approximation of time dependent Ginzburg-Landau equations. Optimal error estimates which are robust with respect to a large Ginzburg-Landau parameter are established for a semi-discrete in time and a fully discrete approximation scheme. The proofs rely on an asymptotic expansion of the exact solution and a stability result for degree-one Ginzburg-Landau vortices. The error bounds prove that degree-one vortices can be approximated robustly while unstable higher...