A NONEXISTENCE THEOREM FOR THE TWO-DIMENSIONAL AMLOGUE OF THE CATENARY
From MaRDI portal
Publication:3772819
DOI10.1524/anly.1986.6.23.143zbMath0634.49020OpenAlexW2313461467MaRDI QIDQ3772819
Publication date: 1986
Published in: Analysis (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1524/anly.1986.6.23.143
Related Items (14)
What Is the Shape of a Cupola? ⋮ Invariant singular minimal surfaces ⋮ On a singular variational integral with linear growth. I: Existence and regularity of minimizers ⋮ The two-dimensional analogue of the Lorentzian catenary and the Dirichlet problem ⋮ A Weierstrass type representation for translating solitons and singular minimal surfaces ⋮ The one dimensional case of the singular minimal surfaces with density ⋮ Geometric and architectural aspects of the singular minimal surface equation ⋮ Geometry of \([\varphi, {\mathbf{e}}_3\)-minimal surfaces in \(\mathbb{R}^3\)] ⋮ Ruled singular minimal surfaces ⋮ Uniqueness of critical points and maximum principles of the singular minimal surface equation ⋮ The Dirichlet problem for the \(\alpha \)-singular minimal surface equation ⋮ Equilibrium of surfaces in a vertical force field ⋮ A Bernstein result for energy minimizing hypersurfaces ⋮ A dome subjected to compression forces: a comparison study between the mathematical model, the catenary rotation surface and the paraboloid
This page was built for publication: A NONEXISTENCE THEOREM FOR THE TWO-DIMENSIONAL AMLOGUE OF THE CATENARY
