Revision as of 12:10, 26 October 2022

Hypergeometric Differential Equation

According to §9.151 (p. 1045) of Gradshteyn & Ryzhik (1965), "… a hypergeometric series is one of the solutions of the differential equation,

$0$

$=$

$z (1 - z) \frac{d^{2} u}{d z^{2}} + [γ - (α + β + 1) z] \frac{d u}{d z} - α β u,$

which is called the hypergeometric equation. And, according to §9.10 (p. 1039) of Gradshteyn & Ryzhik (1965), "A hypergeometric series is a series of the form,

$F (α, β; γ; z)$

$=$

$1 + [\frac{α \cdot β}{γ \cdot 1}] z + [\frac{α (α + 1) β (β + 1)}{γ (γ + 1) \cdot 1 \cdot 2}] z^{2} + [\frac{α (α + 1) (α + 2) β (β + 1) (β + 2)}{γ (γ + 1) (γ + 2) \cdot 1 \cdot 2 \cdot 3}] z^{3} + \dots$

Among other attributes, Gradshteyn & Ryzhik (1965) note that this, "… series terminates if $α$ or $β$ is equal to a negative integer or to zero."

LAWE

Drawing from an accompanying discussion, we have the,

LAWE: Linear Adiabatic Wave (or Radial Pulsation) Equation

$\frac{d^{2} x}{d r_{0}^{2}} + [\frac{4}{r_{0}} - (\frac{g_{0} ρ_{0}}{P_{0}})] \frac{d x}{d r_{0}} + (\frac{ρ_{0}}{γ_{g} P_{0}}) [ω^{2} + (4 - 3 γ_{g}) \frac{g_{0}}{r_{0}}] x = 0$

where,

$g_{0}$

$=$

$- \frac{1}{ρ_{0}} \frac{d P_{0}}{d r_{0}} .$

📚 T. E. Sterne (1937, MNRAS, Vol. 97, pp. 582 - 593): Models of Radial Oscillation
📚 C. Prasad (1948, MNRAS, Vol. 108, pp. 414 - 416): Radial Oscillations of a Particular Stellar Model
Z. Kopal (1948, Proceedings of the National Academy of Sciences, Vol. 34, pp. 377 - 384, Radial Oscillations of the Limiting Models of Polytropic Gas Spheres.
In an article titled, "Radial Oscillations of a Stellar Model," C. Prasad (1949, MNRAS, 109, 103) investigated the properties of an equilibrium configuration with a prescribed density distribution given by the expression,

$ρ (r) = ρ_{c} [1 - (\frac{r}{R})^{2}],$

where, $ρ_{c}$ is the central density and, $R$ is the radius of the star.
R. Van der Borght (1970, Proceedings of the Astronomical Society of Australia, Vol. 1, Issue 7, pp. 325 - 326), Adiabatic Oscillations of Stars.

MathProjects/EigenvalueProblemN1: In the most general context, the LAWE takes the form,

$[P] \frac{d^{2} 𝒢_{σ}}{d x^{2}} + [\frac{4 P}{x} + P^{'}] \frac{d 𝒢_{σ}}{d x} + [σ^{2} ρ + \frac{α P^{'}}{x}] 𝒢_{σ}$

$=$

$0 .$

Properties of Analytically Defined Astrophysical Structures
Model	$ρ (x)$	$P (x)$	$P^{'} (x)$
Uniform-density	$1$	$1 - x^{2}$	$- 2 x$
Linear	$1 - x$	$(1 - x)^{2} (1 + 2 x - \frac{9}{5} x^{2})$	$- \frac{12}{5} x (1 - x) (4 - 3 x)$
Parabolic	$1 - x^{2}$	$(1 - x^{2})^{2} (1 - \frac{1}{2} x^{2})$	$- x (1 - x^{2}) (5 - 3 x^{2})$
$n = 1$ Polytrope	$\frac{\sin x}{x}$	$[\frac{\sin x}{x}]^{2}$	$\frac{2}{x} [\cos x - \frac{\sin x}{x}] \frac{\sin x}{x}$

@@ Line 45: / Line 45: @@
 </table>
 Among other attributes, [http://www.mathtable.com/gr/ Gradshteyn &amp; Ryzhik (1965)] note that this, <font color="darkgreen">"&hellip; series terminates if <math>\alpha</math> or <math>\beta</math> is equal to a negative integer or to zero."</font>
+=LAWE=
+Drawing from an [[SSC/Perturbations#2ndOrderODE|accompanying discussion]], we have the,
+<div align="center" id="2ndOrderODE">
+<font color="#770000">'''LAWE: &nbsp; Linear Adiabatic Wave''' (or ''Radial Pulsation'') '''Equation'''</font><br />
+{{Math/EQ_RadialPulsation01}}
+</div>
+where,
+<table border="0" cellpadding="5" align="center">
+<tr>
+  <td align="right">
+<math>g_0</math>
+  </td>
+  <td align="center">
+<math>=</math>
+  </td>
+  <td align="left">
+<math>- \frac{1}{\rho_0} \frac{dP_0}{dr_0}   \, .</math>
+  </td>
+</tr>
+</table>
 =See Also=

Appendix/Mathematics/Hypergeometric: Difference between revisions

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Hypergeometric Differential Equation

LAWE

See Also

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Appendix/Mathematics/Hypergeometric: Difference between revisions

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Hypergeometric Differential Equation

LAWE

See Also

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