Biharmonic maps from a complete Riemannian manifold into a non-positively curved manifold

We consider biharmonic maps $\phi :(M,g)\rightarrow (N,h)$ from a complete Riemannian manifold into a Riemannian manifold with non-positive sectional curvature. Assume that $ p $ satisfies $ 2\le p <\infty $ . If for such a $ p $ , $\int _M|\tau (\phi )|^{ p }\,\mathrm{d}v_g<\infty $ and $\int _M|\,\mathrm{d}\phi |^2\,\mathrm{d}v_g<\infty ,$ where $\tau (\phi )$ is the tension field of $\phi $ , then we show that $\phi $ is harmonic. For a biharmonic submanifold, we obtain that the above assumption $\int _M|\,\mathrm{d}\phi |^2\,\mathrm{d}v_g<\infty $ is not necessary. These results give affirmative partial answers to the global version of generalized Chen’s conjecture.     

Upper Bounds on the First Eigenvalue for a Diffusion Operator via Bakry–Émery Ricci Curvature II

Let ${L=\Delta-\nabla\varphi\cdot\nabla}$ be a symmetric diffusion operator with an invariant measure ${d\mu=e^{-\varphi}dx}$ on a complete Riemannian manifold. In this paper we prove Li–Yau gradient estimates for weighted elliptic equations on the complete manifold with ${|\nabla \varphi| \leq \theta}$ and ∞-dimensional Bakry–Émery Ricci curvature bounded below by some negative constant. Based on this, we give an upper bound on the first eigenvalue of the diffusion operator L on this kind manifold, and thereby generalize a Cheng’s result on the Laplacian case (Math Z, 143:289–297, 1975).     

A generalized min–max theorem for functionals of strongly indefinite sign

We consider non-linear Schrödinger equations of the following type: $$\begin{aligned} \left\{ \begin{array}{l} -\Delta u(x) + V(x)u(x)-q(x)|u(x)|^\sigma u(x) = \lambda u(x), \quad x\in \mathbb{R }^N \\ u\in H^1(\mathbb{R }^N)\setminus \{0\}, \end{array} \right. \end{aligned}$$ where $N\ge 1$ and $\sigma >0$ . We will concentrate on the case where both $V$ and $q$ are periodic, and we will analyse what happens for different values of $\lambda $ inside a spectral gap $]\lambda ^-,\lambda ^+[$ . We derive both the existence of multiple orbits of solutions and the bifurcation of solutions when $\lambda \nearrow \lambda ^+$ . Thereby we use the corresponding energy function ${I_\lambda }$ and we derive a new variational characterization of multiple critical levels for such functionals: in this way we get multiple orbits of solutions. One main advantage of our new view on some specific critical values $c_0(\lambda )\le c_1(\lambda )\le \cdots \le c_n(\lambda )\le \cdots $ is a multiplicity result telling us something about the number of critical points with energies below $c_n(\lambda )$ , even if for example two of these values $c_i(\lambda )$ and $c_j(\lambda )$ ( $0\le i<j\le n$ ) coincide. Let us close this summary by mentioning another main advantage of our variational characterization of critical levels: we present our result in an abstract setting that is suitable for other problems and we give some hints about such problems (like the case corresponding to a Coulomb potential $V$ ) at the end of the present paper.     

The Mean Curvature of a Transversely Orientable Foliation

In this work we study a codimension-one C^∞-foliation ${cal F}$ of a complete Riemannian manifold M. We assume that ${cal F}$ is transversely orientable. Under this hypothesis, we show that the mean curvature function of ${cal F}$ has a superior limit. Using this result, we find a necessary and sufficient condition for the foliation ${cal F}$ to be totally geodesic.     

The classification of (m, \rho)-quasi-Einstein manifolds

If there exist a smooth function f on $(M^n, g)$ and three real constants $m,\rho ,\lambda $ ( $0<m\le \infty $ ) such that $$\begin{aligned} R_{ij}+f_{ij}-\frac{1}{m}f_if_j=(\rho R+\lambda ) g_{ij}, \end{aligned}$$ we call $(M^n,g)$ a $(m,\rho )$ -quasi-Einstein manifold. Here $R_{ij}$ is the Ricci curvature and R is the scalar curvature of the metric g, respectively. This is a special case of the so-called generalized quasi-Einstein manifold which was a natural generalization of gradient Ricci solitons associated with the Hamilton’s Ricci flow. In this paper, we first obtain some rigidity results for compact $(m,\rho )$ -quasi-Einstein manifolds. Then, we give some classifications under the assumption that the Bach tensor of $(M^n,g)$ is flat.     

Existence of Wave Operators with Time-Dependent Modifiers for the Schrödinger Equations with Long-Range Potentials on Scattering Manifolds

We construct time-dependent wave operators for Schrödinger equations with long-range potentials on a manifold M with asymptotically conic structure. We use the two space scattering theory formalism, and a reference operator on a space of the form ${\mathbb{R} \times \partial M}$ , where ${\partial M}$ is the boundary of M at infinity. We construct exact solutions to the Hamilton–Jacobi equation on the reference system ${\mathbb{R} \times \partial M}$ and prove the existence of the modified wave operators.     

Seven Classes of Harmonic Diffeomorphisms

We deduce two necessary and sufficient conditions for a diffeomorphism $f : M \to \overline{M}$ of a Riemannian manifold (M,g) onto a Riemannian manifold $(\overline{M},\bar g)$ to be harmonic. Using the representation theory of groups, we define in an intrinsic way seven classes of such harmonic diffeomorphisms and partly describe the geometry of each class.     

Existence of integral m-varifolds minimizing \int \!|A|^p and \int \!|H|^p,\,p>m, in Riemannian manifolds

We prove existence of integral rectifiable $m$ -dimensional varifolds minimizing functionals of the type $\int |H|^p$ and $\int |A|^p$ in a given Riemannian $n$ -dimensional manifold $(N,g),\,2\le m<n$ and $p>m,$ under suitable assumptions on $N$ (in the end of the paper we give many examples of such ambient manifolds). To this aim we introduce the following new tools: some monotonicity formulas for varifolds in ${\mathbb{R }^S}$ involving $\int |H|^p,$ to avoid degeneracy of the minimizer, and a sort of isoperimetric inequality to bound the mass in terms of the mentioned functionals.     

On the structure of co-Kähler manifolds

By the work of Li, a compact co-Kähler manifold $M$ is a mapping torus $K_\varphi $ , where $K$ is a Kähler manifold and $\varphi $ is a Hermitian isometry. We show here that there is always a finite cyclic cover $\overline{M}$ of the form $\overline{M} \cong K \times S^1$ , where $\cong $ is equivariant diffeomorphism with respect to an action of $S^1$ on $M$ and the action of $S^1$ on $K \times S^1$ by translation on the second factor. Furthermore, the covering transformations act diagonally on $S^1, K$ and are translations on the $S^1$ factor. In this way, we see that, up to a finite cover, all compact co-Kähler manifolds arise as the product of a Kähler manifold and a circle.     

The boundary of the Milnor fibre of complex and real analytic non-isolated singularities

Let \(f\) and \(g\) be holomorphic function-germs vanishing at the origin of complex analytic germs of dimension three. Suppose that they have no common irreducible component and that the real analytic map-germ \(f\bar{g}\) has an isolated critical value at 0. We give necessary and sufficient conditions for the real analytic map-germ \(f\bar{g}\) to have a Milnor fibration and we prove that in this case the boundary of its Milnor fibre is a Waldhausen manifold. As an intermediate milestone we describe geometrically the Milnor fibre of map-germs of the form \(f\bar{g}\) defined in a complex surface germ, and we prove an A’Campo-type formula for the zeta function of its monodromy.     

Warped product CR-submanifolds of cosymplectic manifolds

In the present paper, we study warped product CR-submanifolds of cosymplectic manifolds. It is shown that the warped product of the type ${N_\perp\times{_f}N_T}$ is trivial and obtain a characterization result for the warped product of the type ${N_T\times{_f}N_\perp}$ , where N _T and ${N_\perp}$ are invariant and anti-invariant submanifolds of a cosymplectic manifold ${\bar M}$ , respectively.     

Boundary partial regularity for a class of biharmonic maps

We consider the Dirichlet problem for biharmonic maps u from a bounded, smooth domain ${\Omega\subset\mathbb R^n (n\ge 5)}$ to a compact, smooth Riemannian manifold ${N\subset{\mathbb {R}}^l}$ without boundary. For any smooth boundary data, we show that if u is a stationary biharmonic map that satisfies a certain boundary monotonicity inequality, then there exists a closed subset ${\Sigma\subset\overline{\Omega}}$ , with ${H^{n-4}(\Sigma)=0}$ , such that ${\displaystyle u\in C^\infty(\overline\Omega\setminus\Sigma, N)}$ .     

A variational characterization of the catenoid

In this note, we use a result of Osserman and Schiffer (Arch. Rational Mech. Anal. 58:285–307, 1975) to give a variational characterization of the catenoid. Namely, we show that subsets of the catenoid minimize area within a geometrically natural class of minimal annuli. To the best of our knowledge, this fact has gone unremarked upon in the literature. As an application of the techniques, we give a sharp condition on the lengths of a pair of connected, simple closed curves $\sigma _1$ and $\sigma _2$ lying in parallel planes that precludes the existence of a connected minimal surface $\Sigma $ with $\partial \Sigma =\sigma _1\cup \sigma _2$ .     

L’espace symétrique de Drinfeld et correspondance de Langlands locale I

We give an upper bound of a Hamiltonian displacement energy of a unit disk cotangent bundle $D^*M$ in a cotangent bundle $T^*M$ , when the base manifold $M$ is an open Riemannian manifold. Our main result is that the displacement energy is not greater than $C r(M)$ , where $r(M)$ is the inner radius of $M$ , and $C$ is a dimensional constant. As an immediate application, we study symplectic embedding problems of unit disk cotangent bundles. Moreover, combined with results in symplectic geometry, our main result shows the existence of short periodic billiard trajectories and short geodesic loops.     

Real hypersurfaces of a complex space form

In this paper, we show that an n-dimensional connected non-compact Ricci soliton isometrically immersed in the flat complex space form ${(C^{\frac{n+1}{2}},J,\left\langle ,\right\rangle )}$ , with potential vector field of the Ricci soliton is the characteristic vector field of the real hypersurface is an Einstein manifold. We classify connected Hopf hypersurfaces in the flat complex space form ${(C^{\frac{n+1}{2}},J,\left\langle ,\right\rangle )}$ and also obtain a characterization for the Hopf hypersurfaces in ${(C^{\frac{n+1}{2}},J,\left\langle ,\right\rangle ) }$ .     

Surgery on a Stratified Space

Let Y be a closed manifold with a locally flat submanifold \({Z\subset Y}\) and X be a manifold with a boundary \({\partial X}\) . In this paper we construct the algebraic surgery theory of a stratified space that is homeomorphic to \({Y\cup X}\) with transversal intersection \({Y\cap X= Z=\partial X}\) . We develop the algebraic surgery theory of Ranicki to this case and we obtain relations between the introduced spectra that realize the obstruction groups and the structure sets.     

On binary Kloosterman sums divisible by 3

By counting the coset leaders for cosets of weight 3 of the Melas code we give a new proof for the characterization of Kloosterman sums divisible by 3 for ${\mathbb{F}_{2^m}}$ where m is odd. New results due to Charpin, Helleseth and Zinoviev then provide a connection to a characterization of all ${a\in\mathbb{F}_{2^m}}$ such that ${Tr(a^{1/3})=0}$ ; we prove a generalization to the case ${Tr(a^{1/(2^k-1)})=0}$ . We present an application to constructing caps in PG(n, 2) with many free pairs of points.     

Projective curves with maximal regularity and applications to syzygies and surfaces

We first show that the union of a projective curve with one of its extremal secant lines satisfies the linear general position principle for hyperplane sections. We use this to give an improved approximation of the Betti numbers of curves ${{\mathcal C}\subset \mathbb P^r_K}$ of maximal regularity with ${{\rm deg}\, {\mathcal C}\leq 2r -3}$ . In particular we specify the number and degrees of generators of the vanishing ideal of such curves. We apply these results to study surfaces ${X \subset \mathbb P^r_K}$ whose generic hyperplane section is a curve of maximal regularity. We first give a criterion for ??an early descent of the Hartshorne-Rao function?? of such surfaces. We use this criterion to give a lower bound on the degree for a class of these surfaces. Then, we study surfaces ${X \subset\mathbb P^r_K}$ for which ${h^1(\mathbb P^r_K, {\mathcal I}_X(1))}$ takes a value close to the possible maximum deg X ? r +?1. We give a lower bound on the degree of such surfaces. We illustrate our results by a number of examples, computed by means of Singular, which show a rich variety of occuring phenomena.     

Bergman and Calderón Projectors for Dirac Operators

For a Dirac operator $D_{\bar{g}}$ over a spin compact Riemannian manifold with boundary $(\bar{X},\bar{g})$ , we give a new construction of the Calderón projector on $\partial\bar{X}$ and of the associated Bergman projector on the space of L ² harmonic spinors on $\bar{X}$ , and we analyze their Schwartz kernels. Our approach is based on the conformal covariance of $D_{\bar{g}}$ and the scattering theory for the Dirac operator associated with the complete conformal metric $g=\bar{g}/\rho^{2}$ where ρ is a smooth function on $\bar{X}$ which equals the distance to the boundary near $\partial\bar{X}$ . We show that $\frac{1}{2}(\operatorname{Id}+\tilde{S}(0))$ is the orthogonal Calderón projector, where $\tilde{S}(\lambda)$ is the holomorphic family in {?(λ)≥0} of normalized scattering operators constructed in Guillarmou et al. (Adv. Math., 225(5):2464–2516, 2010), which are classical pseudo-differential of order 2λ. Finally, we construct natural conformally covariant odd powers of the Dirac operator on any compact spin manifold.