An Intrinsic Characterization of Bonnet Surfaces Based on a Closed Differential Ideal

Geometry
doi 10.1155/2014/715679
Full Text
Abstract

Available in full text

Date
Authors
Publisher

Hindawi Limited

Related search

Intrinsic Curvature of Curves and Surfaces and a Gauss–Bonnet Theorem in the Heisenberg Group

Mathematische Zeitschrift
Mathematics
2016English

A Gauss–Bonnet Formula for Closed Semi-Algebraic Sets

Advances in Geometry
GeometryTopology
2008English

Convex Real Projective Structures on Closed Surfaces Are Closed

Proceedings of the American Mathematical Society
MathematicsApplied Mathematics
1993English

The Motion of Point Vortices on Closed Surfaces

Proceedings of the Royal Society A: Mathematical, Physical and Engineering Sciences
MathematicsEngineeringAstronomyPhysics
2015English

Intrinsic Magnetic Moment on (0001) Surfaces of Rhombohedral Graphite

Physical Review B
2010English

Differential Equations of Ideal Memristors

Radioengineering
Electronic EngineeringElectrical
2015English

On an Integral Formula of Gauss-Bonnet-Grotemeyer

Proceedings of the American Mathematical Society
MathematicsApplied Mathematics
1971English

Trajectory Equivalence of Optimal Morse Flows on Closed Surfaces

Proceedings of the International Geometry Center
GeometryApplied MathematicsAnalysisTopology
2018English

Computation of Hyperbolic Geometric Flow on Closed Riemann Surfaces

Pure and Applied Mathematics Quarterly
Mathematics
2012English

Amanote Research

Note-taking for researchers

Follow Amanote

© 2025 Amaplex Software S.P.R.L. All rights reserved.

Privacy PolicyRefund Policy