Quasiopen sets, bounded variation and lower semicontinuity in metric spaces

Abstract: In the setting of a metric space that is equipped with a doubling measure and supports a Poincar\'e inequality, we show that the total variation of functions of bounded variation is lower semicontinuous with respect to $L^1$-convergence in every $1$-quasiopen set. To achieve this, we first prove a new characterization of the total variation in $1$-quasiopen sets. Then we utilize the lower semicontinuity to show that the variation measures of a sequence of functions of bounded variation converging in the strict sense are uniformly absolutely continuous with respect to the $1$-capacity.