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The $L^p$ primitive integral

For each $1\leq p<\infty$ a space of integrable Schwartz distributions, $L^&#39;^{\,p}$, is defined by taking the distributional derivative of all functions in $L^p$. Here, $L^p$ is with respect to Lebesgue measure on the real line. If $f\in L^&#39;^{\,p}$ such that $f$ is the distributional derivative of $F\in L^p$ then the integral is defined as $\int^\infty_{-\infty} fG=-\int^\infty_{-\infty} F(x)g(x)\,dx$, where $g\in L^q$, $G(x)= \int_0^x g(t)\,dt$ and $1/p+1/q=1$. A norm is $\lVert f\rVert&#39;_p=\lVert F\rVert_p$. The spaces $L^&#39;^{\,p}$ and $L^p$ are isometrically isomorphic. Distributions in $L^&#39;^{\,p}$ share many properties with functions in $L^p$. Hence, $L^&#39;^{\,p}$ is reflexive, its dual space is identified with $L^q$, there is a type of Hölder 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 $L^&#39;^{\,1}$ into a Banach algebra isometrically isomorphic to the convolution algebra on $L^1$. Spaces of higher order derivatives of $L^p$ functions are defined. These are also Banach spaces isometrically isomorphic to $L^p$.