Die Parametrisierung des Teichmüllerraumes durch geodätische Längenfunktionen.
Die Resolvente von ... Auf symmetrischen Räumen vom nichtkompakten Typ.
Die zweite Variation von Minimalflächen im ...p mit polygonalem Rand.
Diffeomorphism Finiteness for Manifolds with Ricci Curvature and Ln/2-norm of Curvature Bounded.
Diffeomorphism groups on noncompact manifolds
Difféomorphismes d'une variété symplectique non compacte.
Diffeomorphisms constructively associated with mutually diverging spacetimes which allow a natural identification of event points in general relativity. Part II
In questo lavoro si dà una definizione di divergenza fra cronotopi della Relatività Generale e si costruisce un criterio per l'identificazione dei punti eventi di cronotopi divergenti che appartengono ad una classe consistente con la presenza di campi elettromagnetici nel vuoto.
Diffeomorphisms of the Circle and Geodesic Fields on Riemannian Surfaces of Genus One.
Differentiability and Approximate Differentiability for Intrinsic Lipschitz Functions in Carnot Groups and a Rademacher Theorem
A Carnot group G is a connected, simply connected, nilpotent Lie group with stratified Lie algebra. We study intrinsic Lipschitz graphs and intrinsic differentiable graphs within Carnot groups. Both seem to be the natural analogues inside Carnot groups of the corresponding Euclidean notions. Here ‘natural’ is meant to stress that the intrinsic notions depend only on the structure of the algebra of G. We prove that one codimensional intrinsic Lipschitz graphs are sets with locally finite G-perimeter....
Differentiability of Busemann Functions and Total Excess.
Differentiability of horizontal curves in Carnot–Carathéodory quasispaces.
Differentiability of mappings in the geometry of Carnot manifolds.
Differentiable maps into riemannian manifolds of constant stable osculating rank. II. (Frenet-Theory).
Differentiable maps into riemannian manifolds of constant stable osculating rank. I.
Differentiable sphere theorems for Ricci curvature.
Differential and geometric structure for the tangent bundle of a projective limit manifold
Differential forms as spinors
Differential geometric structures of stable state feedback systems with dual connections
Differential geometry of canonical quantization
Differential geometry of Cartan domains of type four
In this note we compute the sectional curvature for the Bergman metric of the Cartan domain of type IV and we give a classification of complex totally geodesic manifolds for this metric.