Sweeping processes with prescribed behavior on jumps

@article{Recupero2017SweepingPW,
  title={Sweeping processes with prescribed behavior on jumps},
  author={Vincenzo Recupero and Filippo Santambrogio},
  journal={Annali di Matematica Pura ed Applicata (1923 -)},
  year={2017},
  volume={197},
  pages={1311-1332}
}
We present a generalized formulation of sweeping process where the behavior of the solution is prescribed at the jump points of the driving moving set. An existence and uniqueness theorem for such formulation is proved. As a consequence we derive a formulation and an existence/uniqueness theorem for sweeping processes driven by an arbitrary $${\textit{BV}}$$BV moving set, whose evolution is not necessarily right continuous. Applications to the play operator of elastoplasticity are also shown. 

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