Mathematical Research Letters
Volume 9, Issue 4, July 2002 pp. 537-547.
A class of elliptic equations related to optical designAuthors: J. Rubinstein and G. Wolansky
Author institution: Indiana University, and Technion
Summary: We use a local geometric construction to derive a class of elliptic differential operators. The requirement that the operator will be a derivative of a functional leads to a natural characterization of a family of operators that connect the classical Laplace operator to the mean curvature operator. We further show that the elliptic operators derived here have a canonical interpretation in the framework of optical design.
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