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Autori principali: Chakraborty, Symphony, Shang, Hsien
Natura: Preprint
Pubblicazione: 2025
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Accesso online:https://arxiv.org/abs/2505.21650
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author Chakraborty, Symphony
Shang, Hsien
author_facet Chakraborty, Symphony
Shang, Hsien
contents The study of shear layer instability in compressible flows is key to understanding phenomena from aerodynamics to astrophysical jets. Blumen's seminal paper [``Shear layer instability of an inviscid compressible fluid," J. Fluid Mech. {\bf 40}, 769--781 (1970)] established a linear stability framework for inviscid compressible shear flows, emphasizing velocity gradients and compressibility effects. However, the nonlinear regime remains insufficiently explored. This research extends Blumen's framework by conducting a weakly nonlinear stability analysis using the method of multiple scales to derive amplitude equations, such as the Landau-Stuart and complex Landau equations. Perturbation variables are expanded in a power series to capture amplitude evolution beyond linear theory. Finite boundary conditions are incorporated to enhance physical applicability. The study analyzes how compressibility and Mach number influence nonlinear saturation, revealing Mach-dependent bifurcations in Kelvin-Helmholtz instability (KHI) with alternating stable and unstable regimes. Phase portraits and trajectories illustrate transitions, saturation, and spiral decay, which are relevant to astrophysical shear flows. Bifurcation analysis reveals both supercritical and subcritical Hopf behavior in compressible shear flows, underscoring the importance of nonlinear effects in the onset and evolution of flow instabilities. Qualitative and quantitative results of instability evolution have been shown from nonlinear stability analysis. This work bridges the critical gap between linear and fully nonlinear stability analyses by offering a systematic weakly nonlinear framework and the nonlinear dynamics for compressible shear layers. It generalizes the earlier linear results and provides new predictions about bifurcation behavior and long-time state selection in compressible flows.
format Preprint
id arxiv_https___arxiv_org_abs_2505_21650
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Nonlinear Stability and Dynamics of Supersonic Compressible Flows
Chakraborty, Symphony
Shang, Hsien
Fluid Dynamics
High Energy Astrophysical Phenomena
Atmospheric and Oceanic Physics
Computational Physics
The study of shear layer instability in compressible flows is key to understanding phenomena from aerodynamics to astrophysical jets. Blumen's seminal paper [``Shear layer instability of an inviscid compressible fluid," J. Fluid Mech. {\bf 40}, 769--781 (1970)] established a linear stability framework for inviscid compressible shear flows, emphasizing velocity gradients and compressibility effects. However, the nonlinear regime remains insufficiently explored. This research extends Blumen's framework by conducting a weakly nonlinear stability analysis using the method of multiple scales to derive amplitude equations, such as the Landau-Stuart and complex Landau equations. Perturbation variables are expanded in a power series to capture amplitude evolution beyond linear theory. Finite boundary conditions are incorporated to enhance physical applicability. The study analyzes how compressibility and Mach number influence nonlinear saturation, revealing Mach-dependent bifurcations in Kelvin-Helmholtz instability (KHI) with alternating stable and unstable regimes. Phase portraits and trajectories illustrate transitions, saturation, and spiral decay, which are relevant to astrophysical shear flows. Bifurcation analysis reveals both supercritical and subcritical Hopf behavior in compressible shear flows, underscoring the importance of nonlinear effects in the onset and evolution of flow instabilities. Qualitative and quantitative results of instability evolution have been shown from nonlinear stability analysis. This work bridges the critical gap between linear and fully nonlinear stability analyses by offering a systematic weakly nonlinear framework and the nonlinear dynamics for compressible shear layers. It generalizes the earlier linear results and provides new predictions about bifurcation behavior and long-time state selection in compressible flows.
title Nonlinear Stability and Dynamics of Supersonic Compressible Flows
topic Fluid Dynamics
High Energy Astrophysical Phenomena
Atmospheric and Oceanic Physics
Computational Physics
url https://arxiv.org/abs/2505.21650