Explicit minimal Scherk saddle towers of arbitrary even genera in 3

Abstract

Starting from works by Scherk (1835) and by Enneper-Weierstra \ (1863), new minimal surfaces with Scherk ends were found only in 1988 by Karcher (see Karcher1,Karcher). In the singly periodic case, Karcher's examples of positive genera had been unique until Traizet obtained new ones in 1996 (see Traizet). However, Traizet's construction is implicit and excludes towers, namely the desingularisation of more than two concurrent planes. Then, new explicit towers were found only in 2006 by Martin and Ramos Batista (see Martin), all of them with genus one. For genus two, the first such towers were constructed in 2010 (see Valerio2). Back to 2009, implicit towers of arbitrary genera were found in HMM. In our present work we obtain explicit minimal Scherk saddle towers, for any given genus 2k, k3.