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We propose a type of Hopf semimetal indexed by a pair of numbers (p, q), where the Hopf number is given by pq. The Fermi surface is given by a preimage of the Hopf map, which consists of loops nontrivially linked for a nonzero Hopf number. The Fermi surface forms a torus link, whose examples are a Hopf link indexed by (1, 1), Solomon's knot (2, 1), a double Hopf link (2, 2), and a double trefoil knot (3, 2). We may choose p or q to be a half integer, where the Fermi surface is a torus knot, such as a trefoil knot (3/2, 1). It is even possible to make the Hopf number an arbitrary rational number, where a semimetal whose Fermi surface forms open strings is generated.
Motohiko Ezawa (Wed,) studied this question.
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