AbstractIn this paper, we show that the existence of immersions preserving given geometric structures between manifolds can be expressed in terms of a relation between suitably constructed moving coframes on the manifolds, and we show that the key steps in Cartan's method of equivalence can be extended to yield necessary conditions for the existence of such immersions
AbstractIn this paper, a zero factor idea is introduced to extend the convergence framework in [G.-Q...
In this article we continue the author's investigation of the M\"obius-invariant Willmore flow movin...
AbstractThis paper is concerned with the dissipativity of Volterra functional differential equations...
AbstractA basic theorem from differential geometry asserts that, if the Riemann curvature tensor ass...
AbstractIn this paper we introduce the general covariant derivatives of vertical-valued tensor field...
We $\delta$-approximate strictly short (e.g. constant) maps between Riemannin manifolds $f_0:X^m\to ...
AbstractIn 1992, C. Vallée showed that the metric tensor field C=∇ΘT∇Θ associated with a smooth enou...
We analyze the Cauchy problem for non-stationary 1-D flow of a compressible viscous and heat-conduct...
AbstractThis paper studies Sobolev type inequalities on Riemannian manifolds. We show that on a comp...
AbstractLet Γ be a Dini-smooth curve in the complex plane, and let G:=IntΓ. We prove some direct and...
AbstractWe define and examine certain matrix-valued multiplicative functionals with local Kato poten...
Two simple first order equations are derived, and studied from various points of view, describing th...
AbstractThis paper investigates the existence of positive solutions for a second-order differential ...
AbstractTwo simple first order equations are derived, and studied from various points of view, descr...
International audienceIn this text we expound recent results by Idrisse Khemar on the construction o...
AbstractIn this paper, a zero factor idea is introduced to extend the convergence framework in [G.-Q...
In this article we continue the author's investigation of the M\"obius-invariant Willmore flow movin...
AbstractThis paper is concerned with the dissipativity of Volterra functional differential equations...
AbstractA basic theorem from differential geometry asserts that, if the Riemann curvature tensor ass...
AbstractIn this paper we introduce the general covariant derivatives of vertical-valued tensor field...
We $\delta$-approximate strictly short (e.g. constant) maps between Riemannin manifolds $f_0:X^m\to ...
AbstractIn 1992, C. Vallée showed that the metric tensor field C=∇ΘT∇Θ associated with a smooth enou...
We analyze the Cauchy problem for non-stationary 1-D flow of a compressible viscous and heat-conduct...
AbstractThis paper studies Sobolev type inequalities on Riemannian manifolds. We show that on a comp...
AbstractLet Γ be a Dini-smooth curve in the complex plane, and let G:=IntΓ. We prove some direct and...
AbstractWe define and examine certain matrix-valued multiplicative functionals with local Kato poten...
Two simple first order equations are derived, and studied from various points of view, describing th...
AbstractThis paper investigates the existence of positive solutions for a second-order differential ...
AbstractTwo simple first order equations are derived, and studied from various points of view, descr...
International audienceIn this text we expound recent results by Idrisse Khemar on the construction o...
AbstractIn this paper, a zero factor idea is introduced to extend the convergence framework in [G.-Q...
In this article we continue the author's investigation of the M\"obius-invariant Willmore flow movin...
AbstractThis paper is concerned with the dissipativity of Volterra functional differential equations...
DOI
Add to ORKG