Propagation des singularités différentiables pour des opérateurs différentiels à coefficients analytiques
Propagation des singularités pour une classe d'opérateurs à caractéristiques multiples et résolubilité locale
On considère des opérateurs à caractéristiques de multiplicité constante et à partie principale réelle. Avec une hypothèse, dite condition de Lévi, sur les termes d’ordre inférieur, on étend à ces opérateurs le théorème de Duistermaat-Hörmander sur l’invariance par le flot hamiltonien du spectre singulier des solutions de . Un point essentiel réside dans la preuve de l’invariance de la condition de Lévi par transformation canonique. On donne une application à la résolubilité locale de ce type...
Propagation of singularities and maximal functions in the plane.
Propagation of Singularities and Related Problems of Solidification
Propagation of Singularities for Non Real Pseudo-Differential Operators
Proper contractions and invariant subspaces.
Proper subspaces and compatibility
Let 𝓔 be a Banach space contained in a Hilbert space 𝓛. Assume that the inclusion is continuous with dense range. Following the terminology of Gohberg and Zambickiĭ, we say that a bounded operator on 𝓔 is a proper operator if it admits an adjoint with respect to the inner product of 𝓛. A proper operator which is self-adjoint with respect to the inner product of 𝓛 is called symmetrizable. By a proper subspace 𝓢 we mean a closed subspace of 𝓔 which is the range of a proper projection. Furthermore,...
Properness and topological degree for general elliptic operators.
Properness and topological degree for nonlocal reaction-diffusion operators.
Properties and applications of Tauberian operators.
Tauberian operators, which appeared in response to a problem in summability [GaW, KW] have found application in several situations: factorization of operators [DFJP], preservation of isomorphic properties of Banach spaces [N, NR], equivalence between the Radon-Nikodym property and the Krein-Milman property [Sch], and generalized Fredholm operators [Ta, Y].This paper is a survey of the main properties and applications of Tauberian operators.
Properties and applications of the local functional calculus.
Properties of a quasi-uniformly monotone operator and its application to the electromagnetic $p$-$\text {curl}$ systems
In this paper we propose a new concept of quasi-uniform monotonicity weaker than the uniform monotonicity which has been developed in the study of nonlinear operator equation $Au=b$. We prove that if $A$ is a quasi-uniformly monotone and hemi-continuous operator, then $A^{-1}$ is strictly monotone, bounded and continuous, and thus the Galerkin approximations converge. Also we show an application of a quasi-uniformly monotone and hemi-continuous operator to the proof of the well-posedness and convergence...
Properties of attainable sets of evolution inclusions and control systems of subdifferential type.
Properties of derivations on some convolution algebras
For all convolution algebras L 1[0, 1); L loc1 and A(ω) = ∩n L 1(ωn), the derivations are of the form D μ f = Xf * μ for suitable measures μ, where (Xf)(t) = tf(t). We describe the (weakly) compact as well as the (weakly) Montel derivations on these algebras in terms of properties of the measure μ. Moreover, for all these algebras we show that the extension of D μ to a natural dual space is weak-star continuous.
Properties of eigenfunctions of non-local operators
Properties of fixed point set of a multivalued map.
Properties of generalized set-valued stochastic integrals
The paper is devoted to properties of generalized set-valued stochastic integrals defined in [10]. These integrals generalize set-valued stochastic integrals defined by E.J. Jung and J.H. Kim in the paper [4]. Up to now we were not able to construct any example of set-valued stochastic processes, different on a singleton, having integrably bounded set-valued integrals defined in [4]. It was shown by M. Michta (see [11]) that in the general case set-valued stochastic integrals defined by E.J. Jung...
Properties of lush spaces and applications to Banach spaces with numerical index 1
The concept of lushness, introduced recently, is a Banach space property, which ensures that the space has numerical index 1. We prove that for Asplund spaces lushness is actually equivalent to having numerical index 1. We prove that every separable Banach space containing an isomorphic copy of c₀ can be renormed equivalently to be lush, and thus to have numerical index 1. The rest of the paper is devoted to the study of lushness just as a property of Banach spaces. We prove that lushness is separably...
Properties of solutions to second order evolution control systems. I.
Properties of solutions to second order evolution control systems. II.