Add to ORKG22 pages, 4 figuresThis paper investigates some actions "á la Johnson" on the set, denoted by ${\cal E}$, of Spin-structures which are interpreted as special double-coverings of a trivial $S^1-$fibration over a non-orientable surface $N_{g+1}$. The group acting is first a group of orthogonal isomorphisms assoiciated to $N_{g+1}$. A second approach is to consider the subspace of ${\cal E}$ (with $2^{g}$ elements) coming from special double-coverings of $S^1\times F_g$, where $F_g$ is the orientation covering of $N_{g+1}$. The group acting now is a subgroup of the group of symplectic isomorphisms associated to $F_{g}$. In both situations, we obtain results on the number of orbits and the number of elements in each orbit. Except in one case, t...
One of the most important aspects of Clifford algebras is that they can be used to explicitly constr...
For each integer d at least two, we construct non-spin closed oriented flat manifolds with holonomy ...
Let Γg denote the fundamental group of a closed surface of genus g ≥ 2. We show that every geometric...
22 pages, 4 figuresThis paper investigates some actions "á la Johnson" on the set, denoted by ${\cal...
We prove that the existence of a Spin-structure on an oriented realvector bundle and the number of t...
The isomorphism classes of several types of graph coverings of a graph have been enumerated by many ...
A Klein surface is a surface with a dianalytic structure. A double of a Klein surface X is a Klein s...
A Klein surface is a surface with a dianalytic structure. A double of a Klein surface X is a Klein s...
AbstractWe consider finite, orientable, connected, branched coverings of a 2-sphere which have at mo...
The isomorphism classes of several types of graph coverings of a graph have been enumerated by many ...
this paper is to try and find another infinite set of simply connected spin surfaces if possibly wit...
AbstractA well-known theorem of Alexander [1] says that every orientable surface is a branched cover...
AbstractThe isomorphism classes of several types of graph coverings of a graph have been enumerated ...
AbstractA well-known theorem of Alexander [1] says that every orientable surface is a branched cover...
This text is concerned with the construction of fundamental polygons for coverings of finite multipl...
One of the most important aspects of Clifford algebras is that they can be used to explicitly constr...
For each integer d at least two, we construct non-spin closed oriented flat manifolds with holonomy ...
Let Γg denote the fundamental group of a closed surface of genus g ≥ 2. We show that every geometric...
22 pages, 4 figuresThis paper investigates some actions "á la Johnson" on the set, denoted by ${\cal...
We prove that the existence of a Spin-structure on an oriented realvector bundle and the number of t...
The isomorphism classes of several types of graph coverings of a graph have been enumerated by many ...
A Klein surface is a surface with a dianalytic structure. A double of a Klein surface X is a Klein s...
A Klein surface is a surface with a dianalytic structure. A double of a Klein surface X is a Klein s...
AbstractWe consider finite, orientable, connected, branched coverings of a 2-sphere which have at mo...
The isomorphism classes of several types of graph coverings of a graph have been enumerated by many ...
this paper is to try and find another infinite set of simply connected spin surfaces if possibly wit...
AbstractA well-known theorem of Alexander [1] says that every orientable surface is a branched cover...
AbstractThe isomorphism classes of several types of graph coverings of a graph have been enumerated ...
AbstractA well-known theorem of Alexander [1] says that every orientable surface is a branched cover...
This text is concerned with the construction of fundamental polygons for coverings of finite multipl...
One of the most important aspects of Clifford algebras is that they can be used to explicitly constr...
For each integer d at least two, we construct non-spin closed oriented flat manifolds with holonomy ...
Let Γg denote the fundamental group of a closed surface of genus g ≥ 2. We show that every geometric...