Appendix/Ramblings/Interrelating51and00Bipolytropes/Organization: Difference between revisions
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Created page with "__FORCETOC__ <!-- __NOTOC__ will force TOC off --> =Interrelating (5, 1) and (0, 0) Bipolytropes= Here we construct a bipolytrope in which both the core and the envelope have uniform densities, that is, the structure of both the core and the envelope will be modeled using an <math>n = 0</math> polytropic index. It should be possible for the entire structure to be described by closed-form, analytic expressions. Generally, we..." |
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=Interrelating (5, 1) and (0, 0) Bipolytropes= | =Interrelating (5, 1) and (0, 0) Bipolytropes= | ||
Here we construct a [[SSC/Structure/BiPolytropes#BiPolytropes|bipolytrope]] in which both the core and the envelope have uniform densities, that is, the structure of both the core and the envelope will be modeled using an <math>n = 0</math> polytropic index. | ==Structure of (n<sub>c</sub>, n<sub>e</sub>) = (0, 0) Bipolytropes== | ||
Here we draw heavily from an [[SSC/Structure/BiPolytropes/Analytic00|accompanying discussion]] to construct a [[SSC/Structure/BiPolytropes#BiPolytropes|bipolytrope]] in which both the core and the envelope have uniform densities, that is, the structure of both the core and the envelope will be modeled using an <math>n = 0</math> polytropic index. | |||
Revision as of 17:07, 12 October 2022
Interrelating (5, 1) and (0, 0) Bipolytropes
Structure of (nc, ne) = (0, 0) Bipolytropes
Here we draw heavily from an accompanying discussion to construct a bipolytrope in which both the core and the envelope have uniform densities, that is, the structure of both the core and the envelope will be modeled using an polytropic index.
Related Discussions
- Analytic solution with and .
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