"1"^^ . "M\u0159\u00ED\u017Ekov\u00E1 turbulence v He II v kan\u00E1lu kone\u010Dn\u00FDch rozm\u011Br\u016F - teoretick\u00E1 interpretace"@cs . "A\u017E \u0161est \u0159\u00E1d\u016F rozpadu v\u00ED\u0159ivosti He II p\u0159es t\u0159i \u010Dasov\u00E9 dek\u00E1dy v teplotn\u00EDm oboru 1.2 - 2 K v He II m\u016F\u017Ee b\u00FDt pops\u00E1no pomoc\u00ED \u010Dist\u011B klasick\u00E9ho spektr\u00E1ln\u00EDho modelu pro homogenn\u00ED a izotropn\u00ED turbulenci. Model bere do \u00FAvahy kvantov\u00E9 efekty zaveden\u00EDm teplotn\u011B z\u00E1visl\u00E9 efektivn\u00ED kinematick\u00E9 viskozity"@cs . "Up to six orders of magnitude of He II vorticity decaying over three orders of magnitude in time in the temperature range 1.2 - 2 K in He II can be described by a purely classical spectral model for homogenous and isotropic turbulence. The model accounts for the quantum effects by introducing a temperature dependent effective kinematic viscosity" . "RIV/68378271:_____/01:00100531!RIV/2005/AV0/A02005/N" . "Skrbek, Ladislav" . . . "superfluid He; turbulence; quantized vorticies"@en . "RIV/68378271:_____/01:00100531" . "681382" . . . . . "Grid generated He II turbulence in a finite channel - theoretical interpretation"@en . "Z(AV0Z1010914)" . "Springer-Verlag" . . . "[E0DD676FEDF2]" . . . . . . "3-540-42226-9" . "Quantized Vortex Dynamics and Superfluid Turbulence" . "191;198" . . "Grid generated He II turbulence in a finite channel - theoretical interpretation" . "M\u0159\u00ED\u017Ekov\u00E1 turbulence v He II v kan\u00E1lu kone\u010Dn\u00FDch rozm\u011Br\u016F - teoretick\u00E1 interpretace"@cs . "Grid generated He II turbulence in a finite channel - theoretical interpretation"@en . "2"^^ . "Lecture Notes in Physics, 571" . "Grid generated He II turbulence in a finite channel - theoretical interpretation" . "Berlin" . "Niemela, J. J." . "8"^^ . . "Up to six orders of magnitude of He II vorticity decaying over three orders of magnitude in time in the temperature range 1.2 - 2 K in He II can be described by a purely classical spectral model for homogenous and isotropic turbulence. The model accounts for the quantum effects by introducing a temperature dependent effective kinematic viscosity"@en .