Paper detail

Blow-up in the Parabolic Scalar Curvature Equation

The \textit{parabolic scalar curvature equation} is a reaction-diffusion type equation on an $(n-1)$-manifold $Σ$, the time variable of which shall be denoted by $r$. Given a function $R$ on $[r_0,r_1)\timesΣ$ and a family of metrics $γ(r)$ on $Σ$, when the coefficients of this equation are appropriately defined in terms of $γ$ and $R$, positive solutions give metrics of prescribed scalar curvature $R$ on $[r_0,r_1)\timesΣ$ in the form \[ g=u^2dr^2+r^2γ.\] If the area element of $r^2γ$ is expanding for increasing $r$, then the equation is parabolic, and the basic existence problem is to take positive initial data at some $r=r_0$ and solve for $u$ on the maximal interval of existence, which above was implicitly assumed to be $I=[r_0,r_1)$; one often hopes that $r_1=\infty$. However, the case of greatest physical interest, $R>0$, often leads to blow-up in finite time so that $r_1<\infty$. It is the purpose of the present work to investigate the situation in which the blow-up nonetheless occurs in such a way that $g$ is continuously extendible to $\bar M=[r_0,r_1]\timesΣ$ as a manifold with totally geodesic outer boundary at $r=r_1$.