Analytic continuation of fundamental solutions to differential equations with constant coefficients (Q639737)

Let us consider a differential operator with constant coefficients \(P(D)\), and let us denote by \(E\) its fundamental solution. If one denotes by \(P\) the corresponding polynomial, the inverse Fourier transform of \(1/P\) -- assumed integrable -- gives a temperate fundamental solution to the differential operator \(P(D)\). The purpose of the paper is to investigate the dependence of \(E\) on the polynomial \(P\). The study refers to polynomials of one variable with their zeros or coefficients as parameters, and to fundamental solutions defined on a Riemann surface.