The Lp primitive integral

Abstract

For each 1≤ p<∞ a space of integrable Schwartz distributions, L'\,p, is defined by taking the distributional derivative of all functions in Lp. Here, Lp is with respect to Lebesgue measure on the real line. If f∈ L'\,p such that f is the distributional derivative of F∈ Lp then the integral is defined as ∫∞-∞ fG=-∫∞-∞ F(x)g(x)\,dx, where g∈ Lq, G(x)= ∫0x g(t)\,dt and 1/p+1/q=1. A norm is f'p= Fp. The spaces L'\,p and Lp are isometrically isomorphic. Distributions in L'\,p share many properties with functions in Lp. Hence, L'\,p is reflexive, its dual space is identified with Lq, there is a type of H\"older inequality, continuity in norm, convergence theorems, Gateaux derivative. It is a Banach lattice and abstract L-space. Convolutions and Fourier transforms are defined. Convolution with the Poisson kernel is well-defined and provides a solution to the half plane Dirichlet problem, boundary values being taken on in the new norm. A product is defined that makes L'\,1 into a Banach algebra isometrically isomorphic to the convolution algebra on L1. Spaces of higher order derivatives of Lp functions are defined. These are also Banach spaces isometrically isomorphic to Lp.