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   <li>[[SR|Equation of State]] (EOS)
   <li><font color="pink">&clubs;</font> [[SR|Equation of State]] (EOS)
   <ol type="A">
   <ol type="A">
     <li>[[2DStructure/AxisymmetricInstabilities|Axisymmetric Instabilities to Avoid]]; Poincar&eacute;-Wavre theorem</li>
     <li>[[2DStructure/AxisymmetricInstabilities|Axisymmetric Instabilities to Avoid]]; Poincar&eacute;-Wavre theorem</li>
    <li>[[AxisymmetricConfigurations/SolutionStrategies|Axisymmetric Configurations (Solution Strategies)]]; Simple rotation profiles <font color="red">&clubs;</font></li>
     <li>[[SSC/Structure/BiPolytropes/Analytic1.53|BiPolytrope with <math>(n_c, n_e) = (\tfrac{3}{2}, 3)</math>]]; The parameter, &beta;</li>
     <li>[[SSC/Structure/BiPolytropes/Analytic1.53|BiPolytrope with <math>(n_c, n_e) = (\tfrac{3}{2}, 3)</math>]]; The parameter, &beta; <font color="red">&clubs;</font></li>
   </ol>
   </ol>
   </li>
   </li>

Revision as of 21:26, 15 December 2023

Primary (Tiled Menu) Chapters

Context

  1. Principal Governing Equations (PGEs)
    1. Equations Cast in Cylindrical Coordinates
  2. Continuity
  3. Euler
    1. Axisymmetric Configurations (Solution Strategies); Double check vector identities   ⇐   also includes "Simple Rotation Profiles"
    2. Rotating Reference Frame; Euler equation viewed from a rotating frame of reference
      1. Compressible Analogs of Riemann S-Type Ellipsoids; Nonlinear velocity cross-product
      2. Korycansky and Papaloizou (1996); Nonlinear velocity cross-product
    3. Euler Equation (Conserving Momentum); Earlier draft of "Euler" presentation
  4. 1st Law of Thermodynamics
    1. Radiation-Hydrodynamcis; Nonadiabatic (optically thick) environments
  5. Poisson
  6. Global Energy Considerations
    1. Virial Equilibrium of Spherically Symmetric Configurations; Illustration
    2. Index to Free-Energy and Virial Analyses
  7. Equation of State (EOS)
    1. Axisymmetric Instabilities to Avoid; Poincaré-Wavre theorem
    2. BiPolytrope with (nc,ne)=(32,3); The parameter, β
  8. Ideal Gas
  9. Total Pressure
    1. Determining Temperature from Density & Pressure; A solution to quartic equation
  10. Bond, Arnett, & Carr (1984)
    1. Spherically Symmetric Configurations (Stability — Part II); Ledoux and Pekeris (1941)

See Also

  • Means templates and references to other chapters have been checked for completeness.
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