Add to ORKGWe prove that the smallest non-trivial quotient of the mapping class group of a connected orientable surface of genus g≥3 without punctures is Sp2g(2), thus confirming a conjecture of Zimmermann. In the process, we generalise Korkmaz’s results on C-linear representations of mapping class groups to projective representations over any field
We continue the study of low dimensional linear representations of mapping class groups of surfaces ...
AbstractIn [B. Szepietowski, A presentation for the mapping class group of a non-orientable surface ...
AbstractThis paper describes a linear representation Ф of the mapping class group M, of an orientabl...
Kielak D, Pierro E. On the smallest non-trivial quotients of mapping class groups. GROUPS GEOMETRY A...
A well-known conjecture asserts that the mapping class group of a surface (possibly with punctures/b...
We continue the study of low dimensional linear representations of mapping class groups of surfaces ...
AbstractIn this article we show that for each genus g⩾4, the mapping class group Modg, contains a su...
In the paper [8] we gave a simple presentation of two generators for the mapping class group M2 of t...
One of the basic and important problems to study algebraic structures of the mapping class groups is...
ABSTRACT. Let $\Sigma_{g,1} $ be an orientable compact surface of genus $g $ with 1 boundary compone...
The surface mapping class groups are involved in different domains of mathematics, E~specially in 3-...
The surface mapping class groups are involved in different domains of mathematics, E~specially in 3-...
Recall that the first homology group H1(G) of a group G is the derived quotient G/[G, G]. The first ...
In this work we will find the minimun genus of a compact non orientable Riemann Surface, having a. g...
We show that the mapping class group of any closed connected orientable surface of genus at least fi...
We continue the study of low dimensional linear representations of mapping class groups of surfaces ...
AbstractIn [B. Szepietowski, A presentation for the mapping class group of a non-orientable surface ...
AbstractThis paper describes a linear representation Ф of the mapping class group M, of an orientabl...
Kielak D, Pierro E. On the smallest non-trivial quotients of mapping class groups. GROUPS GEOMETRY A...
A well-known conjecture asserts that the mapping class group of a surface (possibly with punctures/b...
We continue the study of low dimensional linear representations of mapping class groups of surfaces ...
AbstractIn this article we show that for each genus g⩾4, the mapping class group Modg, contains a su...
In the paper [8] we gave a simple presentation of two generators for the mapping class group M2 of t...
One of the basic and important problems to study algebraic structures of the mapping class groups is...
ABSTRACT. Let $\Sigma_{g,1} $ be an orientable compact surface of genus $g $ with 1 boundary compone...
The surface mapping class groups are involved in different domains of mathematics, E~specially in 3-...
The surface mapping class groups are involved in different domains of mathematics, E~specially in 3-...
Recall that the first homology group H1(G) of a group G is the derived quotient G/[G, G]. The first ...
In this work we will find the minimun genus of a compact non orientable Riemann Surface, having a. g...
We show that the mapping class group of any closed connected orientable surface of genus at least fi...
We continue the study of low dimensional linear representations of mapping class groups of surfaces ...
AbstractIn [B. Szepietowski, A presentation for the mapping class group of a non-orientable surface ...
AbstractThis paper describes a linear representation Ф of the mapping class group M, of an orientabl...