Positive periodic solutions to an indefinite Minkowski-curvature equation

Abstract

We investigate the existence, non-existence, multiplicity of positive periodic solutions, both harmonic (i.e., T-periodic) and subharmonic (i.e., kT-periodic for some integer k ≥ 2) to the equation equation* ( u'1-(u')2 )' + λ a(t) g(u) = 0, equation* where λ > 0 is a parameter, a(t) is a T-periodic sign-changing weight function and g [0,+∞[ [0,+∞[ is a continuous function having superlinear growth at zero. In particular, we prove that for both g(u)=up, with p>1, and g(u)= up/(1+up-q), with 0 ≤ q ≤ 1 < p, the equation has no positive T-periodic solutions for λ close to zero and two positive T-periodic solutions (a 'small' one and a 'large' one) for λ large enough. Moreover, in both cases the 'small' T-periodic solution is surrounded by a family of positive subharmonic solutions with arbitrarily large minimal period. The proof of the existence of T-periodic solutions relies on a recent extension of Mawhin's coincidence degree theory for locally compact operators in product of Banach spaces, while subharmonic solutions are found by an application of the Poincar\'e--Birkhoff fixed point theorem, after a careful asymptotic analysis of the T-periodic solutions for λ +∞.