Unfoldings Knot Theory (Corrigendum).
Unfoldings of foliations with multiform first integrals
Let be a codim 1 local foliation generated by a germ of the form for some complex numbers and germs of holomorphic functions at the origin in . We determine, under some conditions, the set of equivalence classes of first order unfoldings and construct explicitly a universal unfolding of . Special cases of this include foliations with holomorphic or meromorphic first integrals. We also show that the unfolding theory for is equivalent to the unfolding theory for the multiform function...
Unfoldings of Meromorphic Functions.
Unicité forte à partir d'une variété de dimension quelconque pour des inégalités différentielles elliptiques
Unicity of the Lie product
Uniform controllability for the beam equation with vanishing structural damping
This paper is devoted to studying the effects of a vanishing structural damping on the controllability properties of the one dimensional linear beam equation. The vanishing term depends on a small parameter . We study the boundary controllability properties of this perturbed equation and the behavior of its boundary controls as goes to zero. It is shown that for any time sufficiently large but independent of and for each initial data in a suitable space there exists a uniformly bounded...
Uniform estimates for the parabolic Ginzburg–Landau equation
We consider complex-valued solutions of the Ginzburg–Landau equation on a smooth bounded simply connected domain of , , where is a small parameter. We assume that the Ginzburg–Landau energy verifies the bound (natural in the context) , where is some given constant. We also make several assumptions on the boundary data. An important step in the asymptotic analysis of , as , is to establish uniform bounds for the gradient, for some . We review some recent techniques developed in...
Uniform estimates for the parabolic Ginzburg–Landau equation
We consider complex-valued solutions uE of the Ginzburg–Landau equation on a smooth bounded simply connected domain Ω of , N ≥ 2, where ε > 0 is a small parameter. We assume that the Ginzburg–Landau energy verifies the bound (natural in the context) , where M0 is some given constant. We also make several assumptions on the boundary data. An important step in the asymptotic analysis of uE, as ε → 0, is to establish uniform Lp bounds for the gradient, for some p>1. We review some...
Unique Normal Forms for Planar Vector Fields.
Uniqueness for a semilinear elliptic equation in non-contractible domains under supercritical growth conditions.
Uniqueness for the harmonic map flow from surface to general targets.
Uniqueness of conformal metrics with prescribed scalar and mean curvatures on compact manifolds with boundary.
Uniqueness of global positive solution branches of nonlinear elliptic problems.
Uniqueness of Harmonie Mappings and of Solutions of Elliptic Equations on Riemannnian Manifolds.
Uniqueness of motion by mean curvature perturbed by stochastic noise
Uniqueness of nonnegative solutions of the Cauchy problem for parabolic equations on manifolds or domains
Uniqueness results for operators in the variational sequence
We prove that the most interesting operators in the Euler-Lagrange complex from the variational bicomplex in infinite order jet spaces are determined up to multiplicative constant by the naturality requirement, provided the fibres of fibred manifolds have sufficiently large dimension. This result clarifies several important phenomena of the variational calculus on fibred manifolds.
Unitons and their moduli.
Universal bounds for eigenvalues of Schrödinger operators on Riemannian manifolds.
Universal connections on Lie groupoids.