On the minimizers of the Möbius cross energy of links

Zheng-Xu He

doi:em/1062621218

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Home > Journals > Experiment. Math. > Volume 11 > Issue 2 > Article

2002 On the minimizers of the Möbius cross energy of links

Zheng-Xu He

Experiment. Math. 11(2): 244-248 (2002).

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Abstract

We give a geometric interpretation for the Euler-Lagrange equation for the Möbius cross energy of (nontrivially linked) 2-component links in the euclidean 3-space. The minimizer of this energy is conjectured to be a Hopf link of 2 round circles. We prove some elementary properties of the minimizers using the Euler-Lagrange equations. In particular, we give a rigorous proof of the fact that the minimizer is topologically a Hopf link.