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• W2016811802 abstract "Existence of infinitely many periodic solutions for the 1-dimensional p-Laplacian equationddt(|dxdt|p−2dxdt)+g(x)=f(t,x) is proved by means of the Poincaré–Birkhoff fixed point theorem, where g∈C(R,R) and is p-sublinear at the origin in the senselim|x|→0g(x)|x|p−2x=+∞ and f∈C(R×R,R) is 1-periodic in the time t, and small with respect to g." @default.
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• W2016811802 date "2007-01-01" @default.
• W2016811802 modified "2023-10-18" @default.
• W2016811802 title "Periodic solutions for the 1-dimensional p-Laplacian equation" @default.
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• W2016811802 doi "https://doi.org/10.1016/j.jmaa.2006.02.027" @default.
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