Abstract
AbstractClassical results concerning Klein–Gordon–Maxwell type systems are shortly reviewed and generalized to the setting of mixed local–nonlocal operators, where the nonlocal one is allowed to be nonpositive definite according to a real parameter. In this paper, we provide a range of parameter values to ensure the existence of solitary (standing) waves, obtained as Mountain Pass critical points for the associated energy functionals in two different settings, by considering two different classes of potentials: constant potentials and continuous, bounded from below, and coercive potentials.
Publisher
Springer Science and Business Media LLC
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