📝 SummarXiv

Abstract

We report on several previously overlooked families of static spherically symmetric solutions in quadratic gravity. Our main result concerns the existence of solutions whose leading exponents depend on the ratio ${\omega=\alpha/(3\beta)}$ of the four-derivative couplings. We demonstrate that the space of models with ${\omega >1}$ contains a dense set that admits non-Frobenius solutions ${(s_*, 2 - 3 s_*)_0}$ (in standard Schwarzschild coordinates), with certain rational numbers $s_*(\omega)$. These solutions correspond to a singular core at ${\bar{r}=0}$. Another related non-Frobenius family, $(s_*, 2 - 3 s_*)_\infty$, exists for a dense set of models with ${1/4 < \omega < 1}$, describing a singular boundary at ${\bar{r}\to\infty}$. Both families are uncovered by recasting the metric into special coordinates in which the solutions become Frobenius. Additionally, for models with any real ratios ${\omega\neq 1}$ we identify two novel families of non-Frobenius solutions around generic points ${\bar{r}=\bar{r}_0}$, $(3/2, 0)_{\bar{r}_0, 1/4}$ and $(3/2, 0)_{\bar{r}_0, 1/2}$ describing a wormhole throat. Finally, we re-derive and summarize all known families of solutions in the standard as well as in modified Schwarzschild coordinates.