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Jones polynomial and knot transitions in topological semimetals
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Jones polynomial and knot transitions in topological semimetals
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Topological nodal line semimetals host stable chained, linked, or knotted line degeneracies in momentum space protected by symmetries. In this paper, we use the Jones polynomial as a general topological invariant to capture the global knot topology of the nodal lines. We show that every possible change in Jones polynomial is attributed to the local evolutions around every point where two nodal lines touch. As an application of our theory, we show that nodal chain semimetals with four touching points can evolve to a Hopf-link. We extend our theory to 3D non-Hermitian multi-band exceptional line semimetals.
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Cited by 1 Pith paper
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Knot Topology in Quantum Spin System
Majorana modes in long-range quantum spin models are mapped to knots and links, with eigenstate curves forming links in gapped phases and knots in gapless phases, characterized by crossing and linking numbers.
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