Consider the following variational problem: among all curves in $\mathbb{R}^n$ of fixed length with prescribed end points and prescribed tangents at the end points, minimise the $L^\infty$-norm of the curvature. We show that the solutions of this problem, and of a generalised version, are characterised by a system of differential equations. Furthermore, we have a lot of information about the structure of solutions, which allows a classification
In this note sufficient conditions for bounds on the deformation gradient of a minimizer of a variat...
Let L(u) = L(u,∇u) be a functional on W1,1(Ω) whose formal Euler-Lagrange equation at the critical p...
For an elliptic, semilinear differential operator of the form S(u) = A : D2u + b(x, u, Du), consider...
Consider the following variational problem: among all curves in Rn of fixed length with prescribed e...
Abstract. We show that the elastic energy E(γ) of a closed curve γ has a minimizer among all plane s...
In this note we announce some results that will appear in [6] on the minimization of the functional ...
We consider the problem of minimizing the bending or elastic energy among Jordan curves confined in ...
We consider the problem of minimizing the bending or elastic energy among Jordan curves confined in ...
In this paper we consider the problem of reconstructing a curve that is partially hidden or corrupte...
AbstractWe study the regular calculus of the variations problem Minimize Iμ(u) = ∝−11 F(μu′(x), u(x)...
It was recently proved in [D. Bucur and A. Henrot, J. Eur. Math. Soc. (JEMS) 19, No. 11, 3355–3376] ...
We show that the elastic energy E(γ) of a closed curve γ has a minimizer among all plane simple regu...
International audienceFor a smooth curve γ, we define its elastic energy as E(γ) = 1 /2 \int k^2 (s)...
Motivated by interpolation problems arising in image analysis, computer vision, shape reconstruction...
We prove new properties for the linear isotropic elasticity system and for thickness minimization pr...
In this note sufficient conditions for bounds on the deformation gradient of a minimizer of a variat...
Let L(u) = L(u,∇u) be a functional on W1,1(Ω) whose formal Euler-Lagrange equation at the critical p...
For an elliptic, semilinear differential operator of the form S(u) = A : D2u + b(x, u, Du), consider...
Consider the following variational problem: among all curves in Rn of fixed length with prescribed e...
Abstract. We show that the elastic energy E(γ) of a closed curve γ has a minimizer among all plane s...
In this note we announce some results that will appear in [6] on the minimization of the functional ...
We consider the problem of minimizing the bending or elastic energy among Jordan curves confined in ...
We consider the problem of minimizing the bending or elastic energy among Jordan curves confined in ...
In this paper we consider the problem of reconstructing a curve that is partially hidden or corrupte...
AbstractWe study the regular calculus of the variations problem Minimize Iμ(u) = ∝−11 F(μu′(x), u(x)...
It was recently proved in [D. Bucur and A. Henrot, J. Eur. Math. Soc. (JEMS) 19, No. 11, 3355–3376] ...
We show that the elastic energy E(γ) of a closed curve γ has a minimizer among all plane simple regu...
International audienceFor a smooth curve γ, we define its elastic energy as E(γ) = 1 /2 \int k^2 (s)...
Motivated by interpolation problems arising in image analysis, computer vision, shape reconstruction...
We prove new properties for the linear isotropic elasticity system and for thickness minimization pr...
In this note sufficient conditions for bounds on the deformation gradient of a minimizer of a variat...
Let L(u) = L(u,∇u) be a functional on W1,1(Ω) whose formal Euler-Lagrange equation at the critical p...
For an elliptic, semilinear differential operator of the form S(u) = A : D2u + b(x, u, Du), consider...