Abstract. We study Riemannian 8-manifolds with an infinitesimal action of SO(3) by which each tangent space breaks into irreducible spaces of dimensions 3 and 5. The relationship with quaternionic, almost product- and PSU(3)-geometry is thoroughly explained using representation-theoretical arguments. Content
AbstractGroup theory indicates the existence of a SO(8)×SO(7)⊂SO(16) invariant self-duality equation...
LaTeX file, 9 pagesA topological theory for euclidean gravity in eight dimensions is built by enforc...
Topological Euclidean gravity is built in eight dimensions for manifolds with Spin(7) subset of SO(8...
ABSTRACT. We study 8-dimensional Riemannian manifolds that admit a PSU(3)-structure. We classify the...
Abstract. This paper gives a uniform, self-contained, and fairly direct approach to a variety of obs...
AbstractThe first part of this paper gives the complete equivariant classification of smooth S3×S3 a...
The paper is an overview of our results concerning the existence of various structures, especially c...
Sp(n) is the group of the quaternionic linear automorphisms acting from the left on a right quaterni...
AbstractWe investigate a new 8-dimensional Riemannian geometry defined by a generic closed and coclo...
AbstractWe introduce the notion of even Clifford structures on Riemannian manifolds, which for rank ...
In this paper we study symplectic 8-manifolds admitting Spin(7) - structure. We give examples and sh...
We investigate a new 8–dimensional Riemannian geometry defined by a generic closed and coclosed 3–fo...
summary:We construct a family of almost quaternionic Hermitian structures from an almost contact met...
The construction of a $N_T=3$ cohomological gauge theory on an eight-dimensional Riemannian manifold...
AbstractA topological theory for Euclidean gravity in eight dimensions can be built by enforcing oct...
AbstractGroup theory indicates the existence of a SO(8)×SO(7)⊂SO(16) invariant self-duality equation...
LaTeX file, 9 pagesA topological theory for euclidean gravity in eight dimensions is built by enforc...
Topological Euclidean gravity is built in eight dimensions for manifolds with Spin(7) subset of SO(8...
ABSTRACT. We study 8-dimensional Riemannian manifolds that admit a PSU(3)-structure. We classify the...
Abstract. This paper gives a uniform, self-contained, and fairly direct approach to a variety of obs...
AbstractThe first part of this paper gives the complete equivariant classification of smooth S3×S3 a...
The paper is an overview of our results concerning the existence of various structures, especially c...
Sp(n) is the group of the quaternionic linear automorphisms acting from the left on a right quaterni...
AbstractWe investigate a new 8-dimensional Riemannian geometry defined by a generic closed and coclo...
AbstractWe introduce the notion of even Clifford structures on Riemannian manifolds, which for rank ...
In this paper we study symplectic 8-manifolds admitting Spin(7) - structure. We give examples and sh...
We investigate a new 8–dimensional Riemannian geometry defined by a generic closed and coclosed 3–fo...
summary:We construct a family of almost quaternionic Hermitian structures from an almost contact met...
The construction of a $N_T=3$ cohomological gauge theory on an eight-dimensional Riemannian manifold...
AbstractA topological theory for Euclidean gravity in eight dimensions can be built by enforcing oct...
AbstractGroup theory indicates the existence of a SO(8)×SO(7)⊂SO(16) invariant self-duality equation...
LaTeX file, 9 pagesA topological theory for euclidean gravity in eight dimensions is built by enforc...
Topological Euclidean gravity is built in eight dimensions for manifolds with Spin(7) subset of SO(8...
DOI
Add to ORKG