Gradient vector fields do not generate twister dynamics

Fortuny Ayuso, Pedro; Sanz Sánchez, Fernando

doi:10.1006/jdeq.2000.3926

Por favor, use este identificador para citar o enlazar este ítem:https://uvadoc.uva.es/handle/10324/68193

Título

Gradient vector fields do not generate twister dynamics

Autor

Fortuny Ayuso, Pedro

Sanz Sánchez, Fernando

Año del Documento

2001

Editorial

Academic Press, Elsevier

Documento Fuente

Journal of Differential Equations 174, 91 100 (2001)

Résumé

Gradient Conjecture states that a solution g of an analytic gradient vector field X approaching to a singularity P of X has a tangent at P. A stronger version asserts that g does not meet an analytic hypersurface an infinite number of times (it is non-oscillating). We prove, in dimension 3, that if g is ``infinitely near'' an analytic curve G not composed of singularities of X, then g is non-oscillating and, moreover, it does not spiral around G in a precise sense.

Palabras Clave

trajectories of vector fields; gradient conjecture; oscillation; spiraling

ISSN

0022-0396

Revisión por pares

DOI

10.1006/jdeq.2000.3926

Patrocinador

Both authors partially supported by The European Commission, TMR Network ``Singularidades de Ecuaciones Diferenciales y Foliaciones'' ERBF MRXCT 96-0040.