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): Difference between revisions

Latest revision as of 01:12, 15 November 2015

Title: On an integrable class of Chebyshev nets

Abstract:
We study surfaces equipped with a Chebyshev net such that the Gauss curvature $K$ and a curvature $G$ of the net satisfy a linear condition $α K + β G + γ = 0$ , where $α, β, γ$ are constants. These surfaces form an integrable class. We point out some of its noteworthy peculiarities.

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

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 | title = On an integrable class of Chebyshev nets
 | abstract = We study surfaces equipped with a Chebyshev net such that the Gauss curvature <math>K</math> and a curvature <math>G</math> of the net satisfy a linear condition <math>\alpha K + \beta G + \gamma = 0</math>, where <math>\alpha,\beta,\gamma</math> are constants.  These surfaces form an integrable class. We point out some of its noteworthy peculiarities.
-| slides =
+| slides = [[Media:Marvan M. On an integrable class of Chebyshev nets (presentation at The Workshop on Integrable Nonlinear Equations, 18-24 October 2015, Mikulov, Czech Republic).pdf|Marvan M. On an integrable class of Chebyshev nets (presentation at The Workshop on Integrable Nonlinear Equations, 18-24 October 2015, Mikulov, Czech Republic).pdf]]
 | references =
 | 79YY-MM-DD = 7984-89-81
 }}

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): Difference between revisions

Latest revision as of 01:12, 15 November 2015

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