Abstract

Conformal mappings provide an elegant formulation for planar elastostatic problems. Here, the mapping function coeficients are used in a new manner as design variables in the genetic-algorithm (GA) approach to find a piecewise smooth optimal shape of a single traction-free hole in an elastic plate that minimizes the local stresses under remote shear. This scheme is suficiently fast and accurate to numerically show that the sought-for shape generates tangential stress of constant absolute value, equal to 30% less than the stress concentration factor (SCF) for the commonly used circular hole. The shape has four symmetrically located corners, and the stress changes sign while remaining finite as it rounds each corner. This is the same shape as the energy-minimizing contour identified in 1986 by the author and Cherkaev for the same load. Other nontrivial examples are given to demonstrate the potential of the approach. Methodologically, this article continues the optimization study first conducted by the author and Cherkaev (J. Appl. Math. Mech. 50:3 (1986), 401–404) and subsequently by Cherkaev et al. (Internat. J. Solids Structures (35):33, 4391–4410).

Keywords

plane elasticity problem, Kolosov–Muskhelishvili potentials, shape optimization, effective energy, extremal elastic structures, genetic algorithm

Authors