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Preface from the original version of this HyperText Book (H_Book):
November 18, 1994
Much of our present, basic understanding of the structure, stability, and dynamical evolution of individual stars, short-period binary star systems, and the gaseous disks that are associated with numerous types of stellar systems (including galaxies) is derived from an examination of the behavior of a specific set of coupled, partial differential equations. These equations — most of which also are heavily utilized in studies of continuum flows in terrestrial environments — are thought to govern the underlying physics of all macroscopic "fluid" systems in astronomy. Although relatively simple in form, they prove to be very rich in nature... <more>
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Pictorial Table of Contents
Context
- Principal Governing Equations
- Continuity Equation
- Euler Equation
- <math>1^\mathrm{st}</math> Law of Thermodynamics
- Poisson Equation
Applications
Spherically Symmetric Configurations
Introduction (Alternate Introduction)
Structure:
Here we show how the set of principal governing equations (PGEs) can be solved to determine the equilibrium structure of spherically symmetric fluid configurations — such as individual, nonrotating stars or protostellar gas clouds. After supplementing the PGEs by specifying an equation of state of the fluid, the system of equations is usually solved by employing one of three techniques to obtain a "detailed force-balanced" model that provides the radius, <math>~R_\mathrm{eq}</math>, of the equilibrium configuration — given its mass, <math>~M</math>, and central pressure, <math>~P_c</math>, for example — as well as details regarding the internal radial profiles of the fluid density and fluid pressure. As our various discussions illustrate, simply varying the power-law index in a polytropic equation of state gives rise to equilibrium configurations that have a wide variety of internal structural profiles.
If one is not particularly concerned about details regarding the distribution of matter within the equilibrium configuration, a good estimate of the size of the equilibrium system can be determined by assuming a uniform-density structure then identifying local extrema in the system's global free energy … <more>
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Solution Strategies: |
Detailed Force-Balance |
Virial Equilibrium |
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Stability:
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Solution Strategy Assuming Spherical Symmetry: |
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Example Solutions: |
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Dynamics:
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Two-Dimensional Configurations
- Introduction
Structure:
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Solution Strategies |
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Example Solutions:
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Stability:
Dynamics:
Three-Dimensional Configurations
Structure:
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Solution Strategies |
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Example Solutions:
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Stability:
- Lou & Bai (2011, MNRAS, 415, 925) — 3D perturbations in an isothermal self-similar flow
Dynamics:
Related Projects Underway
Appendices
See Also
- NIST Digital Library of Mathematical Functions; see also the related CUP Publication
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© 2014 - 2021 by Joel E. Tohline |