Propagation of uncertainty in free vibration of Euler–Bernoulli nanobeam

Abstract: In this paper, Euler-Bernoulli nanobeam based on the framework of Eringen's nonlocal theory is modeled with material uncertainties where the uncertainties are associated with mass density and Young's modulus in terms of fuzzy numbers. A particular type of imprecisely defined number, namely triangular fuzzy number, is taken into consideration. In this regard, double parametric-based Rayleigh-Ritz method has been developed to handle the uncertainties. Vibration characteristics have been investigated, and the pro… Show more

“…Karayer et al [2] introduced the fractional method for some aspects of quantum mechanics. Jena et al [3] showed that the damping characteristics when solving the damped beam equation are well defined by the fractional derivative and solved the model of the large membrane vibration equation using Caputo derivatives. This description does not go into structure, but assumes a degree of heterogeneity.…”

Numerical Modeling of the Influence of Flat Solar Collector Design on Its Thermal Efficiency with the Use of Fractional Calculus

“…Karayer et al [2] introduced the fractional method for some aspects of quantum mechanics. Jena et al [3] showed that the damping characteristics when solving the damped beam equation are well defined by the fractional derivative and solved the model of the large membrane vibration equation using Caputo derivatives. This description does not go into structure, but assumes a degree of heterogeneity.…”

Numerical Modeling of the Influence of Flat Solar Collector Design on Its Thermal Efficiency with the Use of Fractional Calculus

Implementation of Haar wavelet, higher order Haar wavelet, and differential quadrature methods on buckling response of strain gradient nonlocal beam embedded in an elastic medium

Implementation of non-probabilistic methods for stability analysis of nonlocal beam with structural uncertainties