Non-Abrikosov Vortex and Topological Knot in Two-gap Superconductor
arXiv:cond-mat/0311201 · doi:10.1103/PhysRevB.73.180506
Abstract
We establish the existence of topologically stable knot in two-gap superconductor whose topology $Ï_3(S^2)$ is fixed by the Chern-Simon index of the electromagnetic potential. We present a helical magnetic vortex solution in Ginzburg-Landau theory of two-gap superconductor which has a non-vanishing condensate at the core, and identify the knot as a twisted magnetic vortex ring made of the helical vortex. We discuss how the knot can be constructed in the recent two-gap $\rm MgB_2$ superconductor.
4 pages, 3 figures