S W Hawking and G F R Ellis London: Cambridge University Press 1973 pp xi + 391 price £10 Much progress has been made in recent years in understanding the global consequences of the general theory of relativity. Drs Hawking and Ellis have given us a coherent account of this research and of two remarkable predictions which have emerged from it.

http://iopscience.iop.org/article/10.1088/0031-9112/25/6/029/pdf

The Large Scale Structure of Space–Time

This book provides researchers and graduate students with a thorough introduction to the variational analysis of nonlinear problems described by nonlocal operators. The authors give a systematic treatment of the basic mathematical theory and constructive methods for these classes of nonlinear equations, plus their application to various processes arising in the applied sciences. The equations are examined from several viewpoints, with the calculus of variations as the unifying theme. Part I begins the book with some basic facts about fractional Sobolev spaces. Part II is dedicated to the analysis of fractional elliptic problems involving subcritical nonlinearities, via classical variational methods and other novel approaches. Finally, Part III contains a selection of recent results on critical fractional equations. A careful balance is struck between rigorous mathematics and physical applications, allowing readers to see how these diverse topics relate to other important areas, including topology, functional analysis, mathematical physics, and potential theory.

Variational Methods for Nonlocal Fractional Problems

The theory of gravitational lensing is reviewed from a spacetime perspective, without quasi-Newtonian approximations More precisely, the review covers all aspects of gravitational lensing where light propagation is described in terms of lightlike geodesics of a metric of Lorentzian signature It includes the basic equations and the relevant techniques for calculating the position, the shape, and the brightness of images in an arbitrary general-relativistic spacetime It also includes general theorems on the classification of caustics, on criteria for multiple imaging, and on the possible number of images The general results are illustrated with examples of spacetimes where the lensing features can be explicitly calculated, including the Schwarzschild spacetime, the Kerr spacetime, the spacetime of a straight string, plane gravitational waves, and others

https://link.springer.com/content/pdf/10.12942%2Flrr-2004-9.pdf

Gravitational Lensing from a Spacetime Perspective

Ground state solutions for the nonlinear Schrödinger–Maxwell equations

* Preliminaries* Numbers* Sequences and series* Limits and continuity* Differentiation* The elementary transcendental functions* Integration* Infinite series and infinite products* Trigonometric series* Bibliography* Other works by the author* Index

An introduction to classical real analysis, by Karl R. Stromberg. Pp 575. $29·95. 1981. ISBN 0-534-98012-0 (Wadsworth)

https://www.mat.univie.ac.at/~esiprpr/esi1850.pdf

Global hyperbolicity and Palais–Smale condition for action functionals in stationary spacetimes

In order to apply variational methods to the action functional for geodesics of a stationary spacetime, some hypotheses, useful to obtain classical Palais-Smale condition, are commonly used: pseudo-coercivity, bounds on certain coefficients of the metric, etc. We prove that these technical assumptions admit a natural interpretation for the conformal structure (causality) of the manifold. As a consequence, any stationary spacetime with a complete timelike Killing vector field and a complete Cauchy hypersurface (thus, globally hyperbolic), is proved to be geodesically connected.

Global hyperbolicity and Palais-Smale condition for action functionals in stationary spacetimes

On a class of superlinear (p,q)-Laplacian type equations on RN☆

The aim of this paper is investigating the existence of standing waves which are solutions of a nonlinear Schrodinger equation coupled with Maxwell’s equations when a non-homogeneous term breaks the symmetry of the associated functional.

Multiple Solitary Waves for Non-Homogeneous Schrödinger–Maxwell Equations

where Ω is an open smooth bounded subset of R , N ≥ 2, g : ∂Ω→ R is a given continuous function and p > 2 is fixed. If g ≡ 0, it is well known that (1.1) has infinitely many distinct solutions for 2 2 if N = 2. Such results have been proved by using variational methods also for more general odd nonlinearities at the beginning of 70’s (see e.g. [2], [3], [6], [9], [11] and references therein). In all these papers a fundamental role is played by the fact that the energy functional is even in a Banach space, hence it is possible to use a modified version of the classical Ljusternik–Schnirelman theory and the properties of the genus for symmetric sets. On the contrary, if g 6≡ 0 the more general boundary value problem (1.1) loses its symmetry and the previous recalled arguments do not hold. In fact, it is well

/pdf/multiplicity-results-of-an-elliptic-equation-with-non-5ju5caby9x.pdf

Multiplicity results of an elliptic equation with non-homogeneous boundary conditions

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