Ribaucour type Transformations for the Hessian One Equation
Metadata
Show full item recordEditorial
Elsevier
Materia
Ribaucour transformations Improper affine spheres Hessian one equation
Date
2015Referencia bibliográfica
Martínez-López, A.; Milán López, F.; Tenenblat, K. Ribaucour type Transformations for the Hessian One Equation. Nonlinear Analysis: Theory, Methods and Applications, 112: 147–155 (2015). [http://hdl.handle.net/10481/37916]
Sponsorship
Ministerio de Educación Grants No: MTM2013-43970-P, No: PHB2010-0109, Junta de Anadalucía Grants No. FQM325, N0. P06-FQM-01642. Ministério de Ciência e Tecnologia, CNPq Proc. No. 303774/2009-6. Ministério de Educação, CAPES/DGU Proc. No. 23038010833/2010-37.Abstract
We extend the classical theory of Ribaucour transformations to the family of improper affine maps and use it to obtain new solutions of the Hessian one equation. We prove that such transformations produce complete, embedded ends of parabolic type and curves of singularities which generically are cuspidal edges. Moreover, we show that these ends and curves of singularities do no intersect. We apply Ribaucour transformations to some helicoidal improper affine maps providing new 3-parameter families with an interesting geometry and a good behavior at infinity. In particular, we construct improper affine maps, periodic in one variable, with any even number of complete embedded ends.