Ognian Kassabov
Published 2014-12-05Version 1
An interesting problem in classical differential geometry is to find methods to prove that two surfaces defined by different charts actually coincide up to position in space. In a previous paper we proposed a method in this direction for minimal surfaces. Here we explain not only how this method works but also how we can find the correspondence between the minimal surfaces, if they are congruent. We show that two families of minimal surfaces which are proved to be conjugate actually coincide and coincide with their associated surfaces. We also consider another family of minimal polynomial surfaces of degree 6 and we apply the method to show that some of them are congruent.
Comments: 11 pages, 4 figures
Minimal surfaces that attain equality in the Chern-Osserman inequality
Another property of minimal surfaces in Euclidean space
Minimal surfaces in $S^3$ foliated by circles
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