Add to ORKGWOS: 000422670000002In this chapter, we give brief information about geometric structures which will...
In this paper the exterior Einstein equations are explored from a differential geometric point of vi...
summary:We prove that a connected Riemannian manifold admitting a pair of non-trivial Einstein-Weyl ...
We study harmonic maps ∅ : (M,g) → (N, h) which are coupled to the metric g by the Einst...
These notes originated from a series of lectures I delivered at the Centre for Mathematical Analysis...
In this paper, we study warped product manifolds admitting $\tau$-quasi Ricci-harmonic(RH) metrics. ...
This thesis has as its aim the analysis of a possible manifold structure on V, a join of two individ...
One potential pathway to find an ultimate rule governing our universe is to hunt for a connecti...
In this paper we introduce a vector space of virtual warping functions that yield Einstein metrics o...
The principle part of Einstein equations in the harmonic gauge consists of a constrained system of 1...
We study how the changes of coordinates between the class of harmonic coordinates affect the anality...
Many of the technical complications associated with the general theory of relativity ultimately stem...
AbstractWe establish a regularity theorem for the Harmonic-Einstein equation. As a byproduct of the ...
In this paper we take the perspective introduced by Case-Shu-Wei of studying warped product Einstein...
“Nature uses as little as possible of anything ” (Kepler) This conviction of several centuries ago s...
WOS: 000422670000002In this chapter, we give brief information about geometric structures which will...
In this paper the exterior Einstein equations are explored from a differential geometric point of vi...
summary:We prove that a connected Riemannian manifold admitting a pair of non-trivial Einstein-Weyl ...
We study harmonic maps ∅ : (M,g) → (N, h) which are coupled to the metric g by the Einst...
These notes originated from a series of lectures I delivered at the Centre for Mathematical Analysis...
In this paper, we study warped product manifolds admitting $\tau$-quasi Ricci-harmonic(RH) metrics. ...
This thesis has as its aim the analysis of a possible manifold structure on V, a join of two individ...
One potential pathway to find an ultimate rule governing our universe is to hunt for a connecti...
In this paper we introduce a vector space of virtual warping functions that yield Einstein metrics o...
The principle part of Einstein equations in the harmonic gauge consists of a constrained system of 1...
We study how the changes of coordinates between the class of harmonic coordinates affect the anality...
Many of the technical complications associated with the general theory of relativity ultimately stem...
AbstractWe establish a regularity theorem for the Harmonic-Einstein equation. As a byproduct of the ...
In this paper we take the perspective introduced by Case-Shu-Wei of studying warped product Einstein...
“Nature uses as little as possible of anything ” (Kepler) This conviction of several centuries ago s...
WOS: 000422670000002In this chapter, we give brief information about geometric structures which will...
In this paper the exterior Einstein equations are explored from a differential geometric point of vi...
summary:We prove that a connected Riemannian manifold admitting a pair of non-trivial Einstein-Weyl ...