Singular perturbation of minimal surfaces

Friday, October 25, 2013 -
3:00pm to 4:00pm
(w/ N. Kapouleas and N.M. M\o ller) I discuss recent work in which we use singular perturbation techniques  to show that the space of complete embedded minimal surfaces with four ends and genus $k$ ($\mathcal{M}(k,4)$) is non-empty and non-compact for large $k$.
Stephen Kleene
Event Location: 
Fine Hall 314