Paper detail

On the existence of spatially tempered null solutions to linear constant coefficient PDEs

Given a linear, constant coefficient partial differential equation in ${\mathbb{R}}^{d+1}$, where one independent variable plays the role of `time', a distributional solution is called a null solution if its past is zero. Motivated by physical considerations, we consider distributional solutions that are tempered in the spatial directions alone (and do not impose any restriction in the time direction). Considering such spatially tempered distributional solutions, we give an algebraic-geometric characterization, in terms of the polynomial describing the PDE at hand, for the null solution space to be trivial (that is, consisting only of the zero distribution).