Banach function norms via Cauchy polynomials and applications

Let X_1,…,X_k be quasinormed spaces with quasinorms | ⋅ |_j, j = 1,…,k, respectively. For any f = (f_1,⋯,f_k) ∈ X_1 ×⋯× X_k let ρ(f) be the unique non-negative root of the Cauchy polynomial pf(x)=x^k-sum_{j=1}^k!f_j|_j^jx^{k-j} . We prove that ρ(⋅) (which in general cannot be expressed by radicals when k ≥ 5) is a quasinorm on X_1 ×⋯× X_k, which we call "root quasinorm", and we find a characterization of this quasinorm as limit of ratios of consecutive terms of a linear recurrence relation. If X_1,…,X_k are normed, Banach or Banach function spaces, then the same construction gives respectively a normed, Banach or a Banach function space. Norms obtained as roots of polynomials are already known in the framework of the variable Lebesgue spaces, in the case of the exponent simple function with values 1,…,k. We investigate the properties of the root quasinorm and we establish a number of inequalities, which come from a rich literature of the past century. Read More: http://www.worldscientific.com/doi/10.1142/S0129167X15500834