Construction of the log-convex minorant of a sequence \Mα\α∈N0d

Abstract

We give a simple construction of the log-convex minorant of a sequence \Mα\α∈N0d and consequently extend to the d-dimensional case the well-known formula that relates a log-convex sequence \Mp\p∈N0 to its associated function ωM, that is Mp=t>0tp(-ωM(t)). We show that in the more dimensional anisotropic case the classical log-convex condition Mα2≤ Mα-ejMα+ej is not sufficient: convexity as a function of more variables is needed (not only coordinate-wise). We finally obtain some applications to the inclusion of spaces of rapidly decreasing ultradifferentiable functions in the matrix weighted setting.