Radially Symmetric Solutions To The Graphic Willmore Surface Equation

Abstract

We show that a smooth radially symmetric solution u to the graphic Willmore surface equation is either a constant or the defining function of a half sphere in R3. In particular, radially symmetric entire Willmore graphs in R3 must be flat. When u is a smooth radial solution over a punctured disk D()\0\ and is in C1(D()), we show that there exist a constant λ and a function β in C0(D()) such that u''(r) =λ2 r+β(r); moreover, the graph of u is contained in a graphical region of an inverted catenoid which is uniquely determined by λ and β(0). It is also shown that a radial solution on the punctured disk extends to a C1 function on the disk when the mean curvature is square integrable.