The heat equation with the Lp primitive integral

Abstract

For each 1≤ p<∞ a Banach space of integrable Schwartz distributions is defined by taking the distributional derivative of all functions in Lp( R). Such distributions can be integrated when multiplied by a function that is the integral of a function in Lq( R), where q is the conjugate exponent of p. The heat equation on the real line is solved in this space of distributions. The initial data is taken to be the distributional derivative of an Lp( R) function. The solutions are shown to be smooth functions. Initial conditions are taken on in norm. Sharp estimates of solutions are obtained and a uniqueness theorem is proved.