Add to ORKGIn this short note, we shall give a brief survey on geometric aspects of Meyer’s function following the paper [5]. Let $\mathcal{M}_{g} $ be the mapping class group of a smooth oriented closed surface $\Sigma_{g} $ of genus $g $. Namely it is the group of all isotopy classes of orientation preservin
In this paper, we show that the mapping class group of a closed surface can not be geometrically rea...
The surface mapping class groups are involved in different domains of mathematics, E~specially in 3-...
AbstractLet F be an orientable surface of genus g ⩾ 1, either closed or with one boundary component....
The mapping class group Γg of a closed, connected and oriented surface Sg of genus g is dened as the...
AbstractIn this article we show that for each genus g⩾4, the mapping class group Modg, contains a su...
Recall that the first homology group H1(G) of a group G is the derived quotient G/[G, G]. The first ...
Let Σg,n be a compact oriented genus g surface with n boundary components. The mapping class group o...
We describe sufficient conditions which guarantee that a finite set of mapping classes generate a ri...
AbstractWe introduce a semi-algebraic structure on the set of all isotopy classes of non-separatin...
Let Σg be a closed oriented surface of genus g ≥ 2 and Γg the mapping class group of Σg. There are t...
In the paper [8] we gave a simple presentation of two generators for the mapping class group M2 of t...
ABSTRACT. Let $\Sigma_{g,1} $ be an orientable compact surface of genus $g $ with 1 boundary compone...
In this paper, we show that the mapping class group of a closed surface can not be geometrically rea...
A handlebody of genus $g, $ $H_{g} $ , is an orientable 3-manifold, which is constructed ffom a 3-ba...
The surface mapping class groups are involved in different domains of mathematics, E~specially in 3-...
In this paper, we show that the mapping class group of a closed surface can not be geometrically rea...
The surface mapping class groups are involved in different domains of mathematics, E~specially in 3-...
AbstractLet F be an orientable surface of genus g ⩾ 1, either closed or with one boundary component....
The mapping class group Γg of a closed, connected and oriented surface Sg of genus g is dened as the...
AbstractIn this article we show that for each genus g⩾4, the mapping class group Modg, contains a su...
Recall that the first homology group H1(G) of a group G is the derived quotient G/[G, G]. The first ...
Let Σg,n be a compact oriented genus g surface with n boundary components. The mapping class group o...
We describe sufficient conditions which guarantee that a finite set of mapping classes generate a ri...
AbstractWe introduce a semi-algebraic structure on the set of all isotopy classes of non-separatin...
Let Σg be a closed oriented surface of genus g ≥ 2 and Γg the mapping class group of Σg. There are t...
In the paper [8] we gave a simple presentation of two generators for the mapping class group M2 of t...
ABSTRACT. Let $\Sigma_{g,1} $ be an orientable compact surface of genus $g $ with 1 boundary compone...
In this paper, we show that the mapping class group of a closed surface can not be geometrically rea...
A handlebody of genus $g, $ $H_{g} $ , is an orientable 3-manifold, which is constructed ffom a 3-ba...
The surface mapping class groups are involved in different domains of mathematics, E~specially in 3-...
In this paper, we show that the mapping class group of a closed surface can not be geometrically rea...
The surface mapping class groups are involved in different domains of mathematics, E~specially in 3-...
AbstractLet F be an orientable surface of genus g ⩾ 1, either closed or with one boundary component....