Speaker: Lluís Bacardit (UAB)
Title: A generalization of theorem of Birman and Hilden
Abstract: A Theorem of Birman and Hilden says that the standard representation of the braid group by automorphisms of a free group $F_n$ remains faithful after passing to a free product of cyclic groups $C_k^{*n}$. If we take a finite index subgroup of $C_k^{*n}$ invariant by the action of the braid group, the action also is faithful. These two facts allow us to embed braid group in mapping class group of genus greater than 0. We will give a generalization of the Birman Hilden theorem to orientable surface with one boundary component and show some inclusion of mapping class groups in mapping class groups of greater genus.
