Mixed Segre zeta functions and their log-concavity

We introduce and study the mixed Segre zeta function of a sequence of homogeneous ideals in a polynomial ring. This function is a power series encoding information about the mixed Segre classes obtained by extending the ideals to projective spaces of arbitrarily large dimension. Our work generalizes and unifies results by Kleiman and Thorup on mixed Segre classes and by Aluffi on Segre zeta functions. We prove that this power series is rational, with poles corresponding to the degrees of the generators of the ideals. We also show that the mixed Segre zeta function only depends on the integral closure of the ideals. Finally, we prove that the homogenization of the numerator of a modification of the mixed Segre zeta function is denormalized Lorentzian in the sense of Brändén and Huh.