A DISCUSSION ON THE PHYSICS AND TRUTH OF NANOSCALES FOR VIBRATION OF NANOBEAMS BASED ON NONLOCAL ELASTIC STRESS FIELD THEORY
Three critical but overlooked issues in the physics of nonlocal elastic stress field theory for nanobeams are discussed: (ⅰ) why does the presence of increasing nonlocal effects induce reduced nanostructural stiffness in many, but not consistently for all, cases of study, ie. increasing static deflection, decreasing natural frequency and decreasing buckling load, in virtually all previously published works in this subject total of more than 50 papers known since 2003) although intuition in physics tells otherwise? (ⅱ) the intriguing conclusion that nanoscale effects are missing in the solutions in many exemplary cases of study for bending of nanobeams, and (iii) the missing of additional boundary conditions required in the governing higher-order differential equations. Applying the nonlocal elasticity field theory in nanomechanics and an exact variational principal approach, the exact equilibrium conditions, domain governing differential equation and boundary conditions for vibration of nanobeams are derived for the first time. These new equations and conditions involve essential higherorder terms which are missing in virtually all nonlocal models and analyses in previously published works in statics and dynamics of nonlocal nanostructures. Such negligence higher-order terms in these works results in misleading nanoscale effects which predicts completely incorrect, reverse trends with respect to what the conclusion of this paper tells. Effectively, for the first time this paper not only discovers the truth of nanoscale, as far nonlocal elastic stress modelling for nanostructures is concerned, on equilibrium conditions, governing differential equation and boundary conditions but also reveals further the true basic vibration responses for nanobeams with various boundary conditions. It also concludes that the widely accepted equilibrium conditions nonlocal nanostructures currently are in fact not in equilibrium, but they can be made perfect should the nonlocal bending moment be replaced by an equivalent nonlocal bending moment. The conclusions above are illustrated by other approaches nanostructural models such as strain gradient theory, modified couple stress models and experiments.
nanobeam nanoscale nonlocal elasticity nonlocal stress vibration
C.W.Lim
Department of Building and Construction, City University of Hong Kong, Kowloon, Hong Kong, P.R.China
国际会议
The Fifth International Conference on VETOMAC-V(第五届振动工程及机械技术国际会议)
武汉
英文
117-121
2009-08-27(万方平台首次上网日期,不代表论文的发表时间)