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Interfaces of Prescribed Mean Curvature
1987Several questions of mathematical and physical interest lead to the consideration of an “energy functional” of the following type: $$F[V] = \text{(weighted area of}\, S) + \int_{v}\, H dv,$$ (*) where S is the surface bounding the region V of n-space and H is a given summable function. In the following, we shall be concerned with a problem of
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Hypersurfaces of Constant Mean Curvature
1989I want to discuss some aspects of the theory of hypersurfaces of constant mean curvature H. The subject is intimately related to the theory of minimal hypersurfaces which corresponds to the case H = 0. There are, however, some striking differences between the two cases, and this can already be made clear in the simplest situation of surfaces in the ...
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Globally observed trends in mean and extreme river flow attributed to climate change
Science, 2021Lukas Gudmundsson +2 more
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INFO: An efficient optimization algorithm based on weighted mean of vectors
Expert Systems With Applications, 2022Iman Ahmadianfar +2 more
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Boundaries of prescribed mean curvature
1993The author refers to the study of the functional \[ {\mathcal J}_ H(X)= | \partial X|(\Omega)+ \int_ \Omega \phi_ X(x) H(x) dx, \] where \(\Omega\) is an open subset of \(\mathbb{R}^ n\) \((n\geq 2)\), \(H\in L'(\Omega)\), \(\phi_ X\) is the characteristic function of the measurable set \(X\subset \mathbb{R}^ n\) and \(|\partial X|(\Omega)\) is the ...
E. Gonzalez, U. Massari, Tamanini, Italo
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Tumor-Node-Metastasis Staging of Pancreatic Adenocarcinoma
Ca-A Cancer Journal for Clinicians, 2008Matthew H G Katz
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Self-consistent mean-field models for nuclear structure
Reviews of Modern Physics, 2003Michael Bender +2 more
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