The validity of global quadratic stability inequalities for uniquely regular area minimizing hypersurfaces is proved to be equivalent to the uniform positivity of the second variation of the area. Concerning singular area minimizing hypersurfaces, by a “quantitative calibration” argument we prove quadratic stability inequalities with explicit constants for all the Lawson’s cones, excluding six exceptional cases. As a by-product of these results, explicit lower bounds for the first eigenvalues of the second variation of the area on these cones are derived.
Sharp stability inequalities for the Plateau problem / Guido De Philippis; Francesco Maggi. - In: JOURNAL OF DIFFERENTIAL GEOMETRY. - ISSN 0022-040X. - STAMPA. - (2014), pp. 399-456. [10.4310/jdg/1395321846]
Sharp stability inequalities for the Plateau problem
MAGGI, FRANCESCO
2014
Abstract
The validity of global quadratic stability inequalities for uniquely regular area minimizing hypersurfaces is proved to be equivalent to the uniform positivity of the second variation of the area. Concerning singular area minimizing hypersurfaces, by a “quantitative calibration” argument we prove quadratic stability inequalities with explicit constants for all the Lawson’s cones, excluding six exceptional cases. As a by-product of these results, explicit lower bounds for the first eigenvalues of the second variation of the area on these cones are derived.
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