Periodic solutions for the non-local operator (-Delta + m2)s - m(2s) with m>=0
Abstract
By using variational methods we investigate the existence of T-periodic solutions to [(-Deltax + m2)s -m(2s)]u= f(x,u) in (0,T)N u(x+Tei)=u(x) for all x in RN, i=1,...,N where s in (0,1), N>2s, T>0, m>=0 and f(x,u) is a continuous function, T-periodic in x, verifying the Ambrosetti-Rabinowitz condition and a polynomial growth at rate p in (1, (N+2s)/(N-2s)).
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