2019-09-17T00:21:50Z
http://digital.csic.es/dspace-oai/request
oai:digital.csic.es:10261/56120
2018-09-13T07:15:11Z
com_10261_132
com_10261_8
col_10261_889
00925njm 22002777a 4500
dc
López, Cristóbal
author
2000-09-12
An important breakthrough in the development of chaotic dynamics appeared with the original
work of Lorenz [1]. With the aim of weather forecasting, he proposed his now wellknown
model as a low dimensional (three coupled ordinary differential equations) approximation
to an infinite dimensional model (a partial differential equation) of the dynamical
evolution of the atmosphere. Thus, the impact of Chaos theory or Nonlinear Dynamics on
Geophysical fluid dynamics, i.e., fluid mechanics as it is applied to atmospheric or oceanic
systems, has been important even since the first steps of this new field of Science. Briefly,
this Thesis will be concerned with some possibly useful applications of different mathematical,
computational and physical tools coming from Nonlinear Dynamics to specifically
motivated oceanic problems. Of course, this is a very general assertion which we will try
to clarify along this introduction.
http://hdl.handle.net/10261/56120
Some Applications of Nonlinear Physics to Ocean Dynamics: from Lagrangian Chaos to Genetic Algorithms