Add to ORKGThe formalism of hypersurface data allows one to study hypersurfaces of any causal character abstractly (i.e. without viewing them as embedded in an ambient space). The intrinsic and extrinsic geometry of a hypersurface is encoded in a data set $\mathcal{D}$. In this work we codify at the abstract level information about the ambient Ricci tensor by introducing the so-called constraint tensor $\mathcal{R}$. We provide its abstract definition in terms of general data $\mathcal{D}$, without imposing any topological assumptions and in a fully covariant manner. Moreover, we work in arbitrary (hypersurface data) gauge. We prove that, in the embedded case, $\mathcal{R}$ corresponds to a certain combination of components of the ambient Riemann and ...
We introduce a new technique to the study and identification of submanifolds of simply-connected sym...
It is shown how non-null tensors can be represented by vectors with reference to an orthogonal syste...
Many features of dimensional reduction schemes are determined by the breaking of higher dimensional ...
summary:In a nonflat complex space form (namely, a complex projective space or a complex hyperbolic ...
Hermann Weyl's classical invariant theory has been instrumental in the study of myriad geometrical s...
The curvature tensor is the most important isometry invariant of a Riemannian metric. We study sever...
The curvature tensor is the most important isometry invariant of a Riemannian metric. We study sever...
In order to control locally a space-time which satisfies the Einstein equations, what are the minim...
The paper examines the properties that constraint manifolds possess as Riemannian submanifolds of th...
Ricci curvature plays an important role in understanding the relationship between the geom-etry and ...
We study the prescribed Ricci curvature problem for homogeneous metrics. Given a (0,2)-tensor field ...
summary:We use curvature decompositions to construct generating sets for the space of algebraic curv...
We compare two standard approaches to defining lower Ricci curvature bounds for Riemannian metrics o...
This paper is devoted to the derivation of field equations in space with the geometric structure gen...
An internal constraint for an elastic material is described either by a submanifold [InlineEquation ...
We introduce a new technique to the study and identification of submanifolds of simply-connected sym...
It is shown how non-null tensors can be represented by vectors with reference to an orthogonal syste...
Many features of dimensional reduction schemes are determined by the breaking of higher dimensional ...
summary:In a nonflat complex space form (namely, a complex projective space or a complex hyperbolic ...
Hermann Weyl's classical invariant theory has been instrumental in the study of myriad geometrical s...
The curvature tensor is the most important isometry invariant of a Riemannian metric. We study sever...
The curvature tensor is the most important isometry invariant of a Riemannian metric. We study sever...
In order to control locally a space-time which satisfies the Einstein equations, what are the minim...
The paper examines the properties that constraint manifolds possess as Riemannian submanifolds of th...
Ricci curvature plays an important role in understanding the relationship between the geom-etry and ...
We study the prescribed Ricci curvature problem for homogeneous metrics. Given a (0,2)-tensor field ...
summary:We use curvature decompositions to construct generating sets for the space of algebraic curv...
We compare two standard approaches to defining lower Ricci curvature bounds for Riemannian metrics o...
This paper is devoted to the derivation of field equations in space with the geometric structure gen...
An internal constraint for an elastic material is described either by a submanifold [InlineEquation ...
We introduce a new technique to the study and identification of submanifolds of simply-connected sym...
It is shown how non-null tensors can be represented by vectors with reference to an orthogonal syste...
Many features of dimensional reduction schemes are determined by the breaking of higher dimensional ...