# Marvan M. On an integrable class of Chebyshev nets, talk at The Workshop on Integrable Nonlinear Equations, 18-24 October 2015, Mikulov, Czech Republic (abstract)

We study surfaces equipped with a Chebyshev net such that the Gauss curvature ${\displaystyle K}$ and a curvature ${\displaystyle G}$ of the net satisfy a linear condition ${\displaystyle \alpha K+\beta G+\gamma =0}$, where ${\displaystyle \alpha ,\beta ,\gamma }$ are constants. These surfaces form an integrable class. We point out some of its noteworthy peculiarities.