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In this paper, we prove new existence and multiplicity results for critical points of lower semicontinuous functionals in Banach spaces, complementing the nonsmooth critical point theory set forth by Szulkin. In particular, we get general deformation lemmas avoiding the Palais-Smale condition, and we adapt a monotonicity trick suited to our problems. We apply our results to study entire solutions with finite energy to Born-Infeld type autonomous equations with continuous nonlinearity f. Under nearly optimal conditions on f, we construct solutions including for the first time, nonradial ones. A companion nonexistence theorem shows the sharpness of our assumptions.
Byeon et al. (Thu,) studied this question.