The Infona portal uses cookies, i.e. strings of text saved by a browser on the user's device. The portal can access those files and use them to remember the user's data, such as their chosen settings (screen view, interface language, etc.), or their login data. By using the Infona portal the user accepts automatic saving and using this information for portal operation purposes. More information on the subject can be found in the Privacy Policy and Terms of Service. By closing this window the user confirms that they have read the information on cookie usage, and they accept the privacy policy and the way cookies are used by the portal. You can change the cookie settings in your browser.
Let $$\Omega \subset \mathbb {R}^n$$ Ω ⊂ R n be a bounded mean convex domain. If $$\alpha <0$$ α < 0 , we prove the existence and uniqueness of classical solutions of the Dirichlet problem in $$\Omega $$ Ω for the $$\alpha $$ α -singular minimal surface equation with arbitrary continuous boundary data.
We consider a column of a stationary rotating surface in Euclidean space. In this paper we obtain a value l0 > 0 in such a way that if the length l of the column satisfies l > l0, then the surface is instable. This extends previous results due to Plateau and Rayleigh for columns of surfaces with constant mean curvature.
Set the date range to filter the displayed results. You can set a starting date, ending date or both. You can enter the dates manually or choose them from the calendar.