Fiber Bundle model with Highly Disordered Breaking Thresholds

Abstract

We present a study of the fiber bundle model using equal load sharing dynamics where the breaking thresholds of the fibers are drawn randomly from a power law distribution of the form p(b) b-1 in the range 10-β to 10β. Tuning the value of β continuously over a wide range, the critical behavior of the fiber bundle has been studied both analytically as well as numerically. Our results are: (i) The critical load σc(β,N) for the bundle of size N approaches its asymptotic value σc(β) as σc(β,N) = σc(β)+AN-1/(β) where σc(β) has been obtained analytically as σc(β) = 10β/(2β e10) for β ≥ βu = 1/(210), and for β<βu the weakest fiber failure leads to the catastrophic breakdown of the entire fiber bundle, similar to brittle materials, leading to σc(β) = 10-β; (ii) the fraction of broken fibers right before the complete breakdown of the bundle has the form 1-1/(2β 10); (iii) the distribution D() of the avalanches of size follows a power law D() - with = 5/2 for c(β) and = 3/2 for c(β), where the crossover avalanche size c(β) = 2/(1-e10-2β)2.