In this paper we determine, under a suitable additional information and in a framework of Gevrey-type functions with respect to the variable x ₁, the spatial part p(x ₁, x ₃) of the factorised kernel σ₁ (x ₁, x ₃, t) = p(x ₁, x ₃)k(t) in the integrodifferential Maxwell system related to a spatial domain of the form Ω × × ₊, where Ω is an interval in . In our context determining p means to show locally in space existence, uniqueness and continuous dependence of p on the data.