| dc.creator | CHALLAPA, L. S. | |
| dc.date.accessioned | 2012-10-20T03:36:22Z | |
| dc.date.accessioned | 2018-07-04T15:38:56Z | |
| dc.date.available | 2012-10-20T03:36:22Z | |
| dc.date.available | 2018-07-04T15:38:56Z | |
| dc.date.created | 2012-10-20T03:36:22Z | |
| dc.date.issued | 2009 | |
| dc.identifier | JOURNAL OF DYNAMICAL AND CONTROL SYSTEMS, v.15, n.2, p.157-176, 2009 | |
| dc.identifier | 1079-2724 | |
| dc.identifier | http://producao.usp.br/handle/BDPI/28997 | |
| dc.identifier | 10.1007/s10883-009-9066-z | |
| dc.identifier | http://dx.doi.org/10.1007/s10883-009-9066-z | |
| dc.identifier.uri | http://repositorioslatinoamericanos.uchile.cl/handle/2250/1625639 | |
| dc.description.abstract | In this paper, we study binary differential equations a(x, y)dy (2) + 2b(x, y) dx dy + c(x, y)dx (2) = 0, where a, b, and c are real analytic functions. Following the geometric approach of Bruce and Tari in their work on multiplicity of implicit differential equations, we introduce a definition of the index for this class of equations that coincides with the classical Hopf`s definition for positive binary differential equations. Our results also apply to implicit differential equations F(x, y, p) = 0, where F is an analytic function, p = dy/dx, F (p) = 0, and F (pp) not equal aEuro parts per thousand 0 at the singular point. For these equations, we relate the index of the equation at the singular point with the index of the gradient of F and index of the 1-form omega = dy -aEuro parts per thousand pdx defined on the singular surface F = 0. | |
| dc.language | eng | |
| dc.publisher | SPRINGER/PLENUM PUBLISHERS | |
| dc.relation | Journal of Dynamical and Control Systems | |
| dc.rights | Copyright SPRINGER/PLENUM PUBLISHERS | |
| dc.rights | restrictedAccess | |
| dc.subject | Binary differential equations | |
| dc.subject | index | |
| dc.title | Invariants of binary differential equations | |
| dc.type | Artículos de revistas | |
