Translating Annuli for Mean Curvature Flow

Abstract

We construct a family of complete, properly embedded, annular translators M such that M lies in a slab and is invariant under reflections in the vertical coordinate planes. Each translator in the family is asymptotic as z -∞ to four vertical planes \y= b\ and \y= B\, where 0<b B < ∞. We call b and B the inner width and the (outer) width of the translator. We show that for each b π/2 and each s>0, there is a translator in the family with inner width b and with necksize s. (We also show that there are no translators with inner width <π/2 having the properties of the examples we construct.)