Korn inequalities for shells with zero Gaussian curvature

  • Yury Grabovsky

    Temple University, Philadelphia, PA, United States
  • Davit Harutyunyan

    École polytechnique fédérale de Lausanne, Lausanne, Switzerland

Abstract

We consider shells with zero Gaussian curvature, namely shells with one principal curvature zero and the other one having a constant sign. Our particular interests are shells that are diffeomorphic to a circular cylindrical shell with zero principal longitudinal curvature and positive circumferential curvature, including, for example, cylindrical and conical shells with arbitrary convex cross sections. We prove that the best constant in the first Korn inequality scales like thickness to the power 3/2 for a wide range of boundary conditions at the thin edges of the shell. Our methodology is to prove, for each of the three mutually orthogonal two-dimensional cross-sections of the shell, a “first-and-a-half Korn inequality”—a hybrid between the classical first and second Korn inequalities. These three two-dimensional inequalities assemble into a three-dimensional one, which, in turn, implies the asymptotically sharp first Korn inequality for the shell. This work is a part of mathematically rigorous analysis of extreme sensitivity of the buckling load of axially compressed cylindrical shells to shape imperfections.

Cite this article

Yury Grabovsky, Davit Harutyunyan, Korn inequalities for shells with zero Gaussian curvature. Ann. Inst. H. Poincaré Anal. Non Linéaire 35 (2018), no. 1, pp. 267–282

DOI 10.1016/J.ANIHPC.2017.04.004