Gravitational Collapse for Polytropic Gaseous Stars: Self-similar Solutions

Abstract

In the supercritical range of the polytropic indices γ∈(1,43) we show the existence of smooth radially symmetric self-similar solutions to the gravitational Euler-Poisson system. These solutions exhibit gravitational collapse in the sense that the density blows-up in finite time. Some of these solutions were numerically found by Yahil in 1983 and they can be thought of as polytropic analogues of the Larson-Penston collapsing solutions in the isothermal case γ=1. They each contain a sonic point, which leads to numerous mathematical difficulties in the existence proof.