Late-time tails for linear waves on radially symmetric stationary spacetimes of two space dimensions

Abstract

We show that the leading-order term in the late-time asymptotics of solutions to the linear wave equation on radially symmetric stationary perturbations of (2 + 1)-dimensional Minkowski space is proportional to u-1/2v-1/2 (which solves the wave equation on Minkowski space), where u and v are double null coordinates. Our proof adapts the physical space techniques in the work of Gajic (arXiv:2203.15838) on the wave equation with an inverse-square potential on the Schwarzschild spacetime. In particular, we extend the rp-weighted energy estimates of Dafermos--Rodnianski (arXiv:0910.4957) to two space dimensions.