We develop a lower and upper solutions method for the periodic problem associated with the capillarity equation \begin{equation*} -\Big( u'/{ \sqrt{1+{u'}^2}}\Big)' = f(t,u) \end{equation*} in the space of bounded variation functions. We get the existence of periodic solutions both in the case where the lower solution $\alpha$ and the upper solution $\beta$ satisfy $\alpha \le \beta$, and in the case where $\alpha \not\le \beta$. In the former case we also prove regularity and order stability of solutions.
Existence, regularity and stability properties of periodic solutions of a capillarity equation in the presence of lower and upper solutions / Obersnel, Franco; Omari, Pierpaolo; Rivetti, Sabrina. - In: NONLINEAR ANALYSIS: REAL WORLD APPLICATIONS. - ISSN 1468-1218. - STAMPA. - 13:(2012), pp. 2830-2852. [10.1016/j.nonrwa.2012.04.012]
Existence, regularity and stability properties of periodic solutions of a capillarity equation in the presence of lower and upper solutions
OBERSNEL, Franco;OMARI, PIERPAOLO;RIVETTI, SABRINA
2012-01-01
Abstract
We develop a lower and upper solutions method for the periodic problem associated with the capillarity equation \begin{equation*} -\Big( u'/{ \sqrt{1+{u'}^2}}\Big)' = f(t,u) \end{equation*} in the space of bounded variation functions. We get the existence of periodic solutions both in the case where the lower solution $\alpha$ and the upper solution $\beta$ satisfy $\alpha \le \beta$, and in the case where $\alpha \not\le \beta$. In the former case we also prove regularity and order stability of solutions.Pubblicazioni consigliate
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