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On links with locally infinite {K}akimizu complexes
Published 19 Oct 2010 in math.GT | (1010.3831v2)
Abstract: We show that the Kakimizu complex of a knot may be locally infinite, answering a question of Przytycki--Schultens. We then prove that if a link $L$ only has connected Seifert surfaces and has a locally infinite Kakimizu complex then $L$ is a satellite of either a torus knot, a cable knot or a connected sum, with winding number 0.
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