Título: Physica D: Nonlinear PhenomenaImportada do Authenticus Pesquisar Publicações da Revista

Vol. 76

Páginas: 291-296

ISSN: 0167-2789

Editora: Elsevier

ISI Web of Knowledge - 1 Citação

Scopus - 1 Citação

ID Authenticus: P-001-JPJ

DOI: 10.1016/0167-2789(94)90265-8

Resumo (PT): The equations governing the dynamics of large-scale perturbations superimposed on incompressible small-scale flow driven by a force have, under suitable conditions, the same structure as Navier-Stokes equations. The breaking of Galilean invariance due to the presence of the small-scale flow will, in general, induce a ¿vertex renormalization¿: the constant a in front of the advective nonlinearity does not remain equal to unity. A class of basic flows where the calculation of a a can be performed analytically is discussed. For finite Reynolds numbers, the constant a can indeed be very different from unity and can also vanish. The Reynolds number and the dynamics of a large-scale flow can then be quite different than predicted by setting a=1.

Abstract (EN): The equations governing the dynamics of large-scale perturbations superimposed on incompressible small-scale flow driven by a force have, under suitable conditions, the same structure as Navier-Stokes equations. The breaking of Galilean invariance due to the presence of the small-scale flow will, in general, induce a 'vertex renormalization': the constant a in front of the advective nonlinearity does not remain equal to unity. A class of basic flows where the calculation of a can be performed analytically is discussed. For finite Reynolds numbers, the constant a can indeed be very different from unity and can also vanish. The Reynolds number and the dynamics of a large-scale flow can then be quite different than predicted by setting a = 1.

Idioma: Inglês

Tipo (Avaliação Docente): Científica

Nº de páginas: 6