Irreducible representations of welded braid group
Abstract
In this paper we study irreducible matrix representations of the welded braid group WBn, also known as the group of conjugating automorphisms of a free group Fn. We prove that WBn has no irreducible representations of dimension r, where 2≤slant r≤slant n-2 for n≥slant 5. We give complete classification of all extensions of irreducible representations of the braid group Bn to the welded braid group WBn of dimensions n-1 (for n≥slant 7) and n (for n≥slant 7, n≠ 8). Classification of all extensions of the irreducible n-1- dimensional reduced Burau representation is given for n≥slant 5, n≠ 6. A new one-parameter family of n-1- dimensional irreducible representations of WBn is discovered. Classification of all extensions of the irreducible n-dimensional standard representation (also known as Tong-Yang-Ma representation) is given for all n≥slant 3. New families of the 3-dimensional irreducible representations of WB3 are discovered.
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