English

Bending the Helicoid

Differential Geometry 2007-05-23 v1

Abstract

We construct Colding-Minicozzi limit minimal laminations in open domains in \rth\rth with the singular set of C1C^1-convergence being any properly embedded C1,1C^{1,1}-curve. By Meeks' C1,1C^{1,1}-regularity theorem, the singular set of convergence of a Colding-Minicozzi limit minimal lamination L{\cal L} is a locally finite collection S(L)S({\cal L}) of C1,1C^{1,1}-curves that are orthogonal to the leaves of the lamination. Thus, our existence theorem gives a complete answer as to which curves appear as the singular set of a Colding-Minicozzi limit minimal lamination. In the case the curve is the unit circle \esf1(1)\esf^1(1) in the (x1,x2)(x_1, x_2)-plane, the classical Bj\"orling theorem produces an infinite sequence of complete minimal annuli HnH_n of finite total curvature which contain the circle. The complete minimal surfaces HnH_n contain embedded compact minimal annuli Hˉn\bar{H}_n in closed compact neighborhoods NnN_n of the circle that converge as nn \to \infty to \rthx3\rth - x_3-axis. In this case, we prove that the Hˉn\bar{H}_n converge on compact sets to the foliation of \rthx3\rth - x_3-axis by vertical half planes with boundary the x3x_3-axis and with \esf1(1)\esf^1(1) as the singular set of C1C^1-convergence. The Hˉn\bar{H}_n have the appearance of highly spinning helicoids with the circle as their axis and are named {\em bent helicoids}.

Keywords

Cite

@article{arxiv.math/0511387,
  title  = {Bending the Helicoid},
  author = {William H. Meeks and Matthias Weber},
  journal= {arXiv preprint arXiv:math/0511387},
  year   = {2007}
}

Comments

17 pages, 4 figures