Understanding the small-scale structure of incompressible turbulence and its implications for the non-local pressure field is one of the fundamental challenges in fluid mechanics. Intense velocity gradient structures tend to cluster on a range of scales which affects the pressure through a Poisson equation. Here we present a quantitative investigation of the spatial distribution of these structures conditional on their intensity for Taylor-based Reynolds numbers in the range [160, 380]. We find that the correlation length of the second invariant of the velocity gradient is proportional to the Kolmogorov scale. It is also a good indicator for the spatial localization of intense enstrophy and strain-dominated regions, as well as the separatio...
We relate the intermittent fluctuations of velocity gradients in turbulence to a whole range of loc...
The Reynolds number scaling of flow topology in the eigenframe of the strain-rate tensor is investig...
Kolmogorov's two-thirds, ((Δv) 2) ∼ e 2/ 3r 2/ 3, and five-thirds, E ∼ e 2/ 3k -5/ 3, laws are forma...
This is the author accepted manuscript. The final version is available from Cambridge University Pre...
The statistics of the velocity gradient tensor A = ∇∇u, which embody the fine scales of turbulence, ...
The well-known isotropic relations [see Kolmogorov, Dokl. Akad. Nauk. SSSR 30, 301 (1941); 32, 16 (1...
The scaling of turbulent motions is investigated by considering the flow in the eigenframe of the lo...
Statistical profiles of the first- and second-order spatial derivatives of velocity and pressure are...
Kolmogorov’s similarity hypotheses and his 4/5 law are valid at very large Reynolds numbers. For flo...
Statistical properties of forced two-dimensional turbulence generated in two different flow domains ...
Fully turbulent flows are characterized by intermittent formation of very localized and intense velo...
We study statistics and structures of pressure and density in the presence of large-scale shock wave...
Statistical profiles of the first- and second-order spatial derivatives of velocity and pressure are...
In a recent study, Lawson & Dawson ( J. Fluid Mech. , vol. 780, 2015, pp. 60–98) present experimenta...
This thesis presents a study on turbulence generated by space-filling fractal square grids using Par...
We relate the intermittent fluctuations of velocity gradients in turbulence to a whole range of loc...
The Reynolds number scaling of flow topology in the eigenframe of the strain-rate tensor is investig...
Kolmogorov's two-thirds, ((Δv) 2) ∼ e 2/ 3r 2/ 3, and five-thirds, E ∼ e 2/ 3k -5/ 3, laws are forma...
This is the author accepted manuscript. The final version is available from Cambridge University Pre...
The statistics of the velocity gradient tensor A = ∇∇u, which embody the fine scales of turbulence, ...
The well-known isotropic relations [see Kolmogorov, Dokl. Akad. Nauk. SSSR 30, 301 (1941); 32, 16 (1...
The scaling of turbulent motions is investigated by considering the flow in the eigenframe of the lo...
Statistical profiles of the first- and second-order spatial derivatives of velocity and pressure are...
Kolmogorov’s similarity hypotheses and his 4/5 law are valid at very large Reynolds numbers. For flo...
Statistical properties of forced two-dimensional turbulence generated in two different flow domains ...
Fully turbulent flows are characterized by intermittent formation of very localized and intense velo...
We study statistics and structures of pressure and density in the presence of large-scale shock wave...
Statistical profiles of the first- and second-order spatial derivatives of velocity and pressure are...
In a recent study, Lawson & Dawson ( J. Fluid Mech. , vol. 780, 2015, pp. 60–98) present experimenta...
This thesis presents a study on turbulence generated by space-filling fractal square grids using Par...
We relate the intermittent fluctuations of velocity gradients in turbulence to a whole range of loc...
The Reynolds number scaling of flow topology in the eigenframe of the strain-rate tensor is investig...
Kolmogorov's two-thirds, ((Δv) 2) ∼ e 2/ 3r 2/ 3, and five-thirds, E ∼ e 2/ 3k -5/ 3, laws are forma...