Local Representations of the Flat Virtual Braid Group

Abstract

We prove that any complex local representation of the flat virtual braid group, FVB2, into GL2(C), has one of the types λi: FVB2 → GL2(C), 1≤ i≤ 12. We find necessary and sufficient conditions that guarantee the irreducibility of representations of type λi, 1≤ i≤ 5, and we prove that representations of type λi, 6≤ i≤ 12, are reducible. Regarding faithfulness, we find necessary and sufficient conditions for representations of type λ6 or λ7 to be faithful. Moreover, we give sufficient conditions for representations of type λ1, λ2, or λ4 to be unfaithful, and we show that representations of type λi, i=3, 5, 8, 9, 10, 11, 12 are unfaithful. We prove that any complex homogeneous local representations of the flat virtual braid group, FVBn, into GLn(C), for n≥ 3, has one of the types γi: FVBn → GLn(C), i=1, 2. We then prove that representations of type γ1: FVBn → GLn(C) are reducible for n≥ 6, while representations of type γ2: FVBn → GLn(C) are irreducible if and only if b≠ y, for n≥ 3. Then, we show that representations of type γ1 are unfaithful for n≥ 3 and that representations of type γ2 are unfaithful if y=b. Furthermore, we prove that any complex homogeneous local representation of the flat virtual braid group, FVBn, into GLn+1(C), for all n≥ 4, has one of the types δi: FVBn → GLn+1(C), 1≤ i≤ 8. We prove that these representations are reducible for n≥ 10. Then, we show that representations of types δi, i≠ 5, 6, are unfaithful, while representations of types δ5 or δ6 are unfaithful if x=y.