Small Heegaard genus and SU(2)
Abstract
Let Y be a closed, orientable 3-manifold with Heegaard genus 2. We prove that if H1(Y;Z) has order 1, 3, or 5, then there is a representation π1(Y) SU(2) with non-abelian image. Similarly, if H1(Y;Z) has order 2 then we find a non-abelian representation π1(Y) SO(3). We also prove that a knot K in S3 is a trefoil if and only if there is a unique conjugacy class of irreducible representations π1(S3 K) SU(2) sending a fixed meridian to (smallmatrixi&0\\0&-ismallmatrix).
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