Integral representation and -convergence for free-discontinuity problems with p(·)-growth

Abstract

An integral representation result for free-discontinuity energies defined on the space GSBVp(·) of generalized special functions of bounded variation with variable exponent is proved, under the assumption of log-H\"older continuity for the variable exponent p(x). Our analysis is based on a variable exponent version of the global method for relaxation devised in Bouchitt\`e, Fonseca, Leoni and Mascarenhas (2002) for a constant exponent. We prove -convergence of sequences of energies of the same type, we identify the limit integrands in terms of asymptotic cell formulas and prove a non-interaction property between bulk and surface contributions.