PGE for Spherically Symmetric Configurations[edit]

One-Dimensional PGEs

If the self-gravitating configuration that we wish to construct is spherically symmetric, then the coupled set of multidimensional, partial differential equations that serve as our principal governing equations can be simplified to a coupled set of one-dimensional, ordinary differential equations. This is accomplished by expressing each of the multidimensional spatial operators — gradient, divergence, and Laplacian — in spherical coordinates^† $(r, θ, φ)$ then setting to zero all derivatives that are taken with respect to the angular coordinates $θ$ and $φ$ . After making this simplification, our governing equations become,

Equation of Continuity

$\frac{d ρ}{d t} + ρ [\frac{1}{r^{2}} \frac{d (r^{2} v_{r})}{d r}] = 0$

Euler Equation

$\frac{d v_{r}}{d t} = - \frac{1}{ρ} \frac{d P}{d r} - \frac{d Φ}{d r}$

Adiabatic Form of the
First Law of Thermodynamics

$\frac{d ϵ}{d t} + P \frac{d}{d t} (\frac{1}{ρ}) = 0$

Poisson Equation

$\frac{1}{r^{2}} [\frac{d}{d r} (r^{2} \frac{d Φ}{d r})] = 4 π G ρ$

Footnotes[edit]

^†See, for example, the Wikipedia discussion of integration and differentiation in spherical coordinates.

See Also[edit]

Part 2 of Spherically Symmetric Configurations: Structure — Solution Strategies
Part 2 of Spherically Symmetric Configurations: Stability — Linearization of Governing Equations
Index to a Variety of Free-Energy and/or Virial Analyses
Spherically Symmetric Configurations (SSC) Index

SSCpt1/PGE

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PGE for Spherically Symmetric Configurations[edit]

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