Abstract
In this work, we consider impulsive infinite-dimensional dynamical systems generated by parabolic equations with continuous bounded right-hand side and with impulsive multi-valued perturbations. Moments of impulses are not fixed and defined by moments of intersection of solutions with some subset of the phase space. We find an explicit formula in the case \(\varepsilon =0\) and prove that for sufficiently small value of the parameter \(\varepsilon >0\) the corresponding nonlinear system also has a global attractor.
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