Differential spaces and singularities of space-time.
Diffusion classique et quantique par un trou noir en formation
Dimension vs. genus: A surface realization of the little k-cubes and an operad
We define a new operad based on surfaces with foliations which contains suboperads. We construct CW models for these operads and provide applications of these models by giving actions on Hochschild complexes (thus making contact with string topology), by giving explicit cell representatives for the Dyer-Lashof-Cohen operations for the 2-cubes and by constructing new Ω spectra. The underlying novel principle is that we can trade genus in the surface representation vs. the dimension k of the little...
Dirac fields on asymptotically flat space-times [Book]
Discrete approaches to quantum gravity in four dimensions.
Discrete compactness for a discontinuous Galerkin approximation of Maxwell's system
In this paper we prove the discrete compactness property for a discontinuous Galerkin approximation of Maxwell's system on quite general tetrahedral meshes. As a consequence, a discrete Friedrichs inequality is obtained and the convergence of the discrete eigenvalues to the continuous ones is deduced using the theory of collectively compact operators. Some numerical experiments confirm the theoretical predictions.
Distinguished Riemann-Hamilton geometry in the polymomentum electrodynamics
In this paper we develop the distinguished (d-) Riemannian differential geometry (in the sense of d-connections, d-torsions, d-curvatures and some geometrical Maxwell-like and Einstein-like equations) for the polymomentum Hamiltonian which governs the multi-time electrodynamics.
Duality-symmetric approach to general relativity and supergravity.
Dual-null dynamics
Dynamic pressure in relativistic thermodynamics
Dynamic processes during accretion into a black hole.
Dynamics of relative motion of test particles in general relativity
Einstein equations for -Berwald-Moor relativistic models.
Einstein Metrics, Spinning Top Motions and Monopoles.
Einstein-Euler equations for matter spacetimes with Gowdy symmetry
We investigate the initial value problem for the Einstein-Euler equations of general relativity under the assumption of Gowdy symmetry on . Given an arbitrary initial data set, we establish the existence of a globally hyperbolic future development and we provide a global foliation of this spacetime in terms of a geometrically defined time-function coinciding with the area of the orbits of the symmetry group. This allows us to construct matter spacetimes with weak regularity which admit, both, impulsive...
Einstein-Maxwell equation on four-dimensional homogeneous spaces.
Einsteinovy rovnice a jejich vybrané důsledky
Einstein-Riemann gravity on deformed spaces.
Electrodynamics in Robertson-Walker spacetimes
Electromagnetic dynamical systems.