A Potential Space Estimate for Solutions of Systems of Nonlocal Equations in Peridynamics

Abstract

We show that weak solutions to the strongly-coupled system of nonlocal equations of linearized peridynamics belong to a potential space with higher integrability. Specifically, we show a function that measures local fractional derivatives of weak solutions to a linear system belongs to Lp for some p > 2 with no additional assumption other than measurability and ellipticity of coefficients. This is a nonlocal analogue of an inequality of Meyers for weak solutions to an elliptic system of equations. We also show that functions in Lp whose Marcinkiewicz-type integrals are in Lp in fact belong to the Bessel potential space Lps. Thus the fractional analogue of higher integrability of the solution's gradient is displayed explicitly. The distinction here is that the Marcinkiewicz-type integral exhibits the coupling from the nonlocal model and does not resemble other classes of potential-type integrals found in the literature.