Torsional rigidity for cylinders with a Brownian fracture

Abstract

We obtain bounds for the expected loss of torsional rigidity of a cylinder L=(-L/2,L/2) × ⊂ 3 of length L due to a Brownian fracture that starts at a random point in L, and runs until the first time it exits L. These bounds are expressed in terms of the geometry of the cross-section ⊂ 2. It is shown that if is a disc with radius R, then in the limit as L → ∞ the expected loss of torsional rigidity equals cR5 for some c∈ (0,∞). We derive bounds for c in terms of the expected Newtonian capacity of the trace of a Brownian path that starts at the centre of a ball in 3 with radius 1, and runs until the first time it exits this ball.