Eigenanalysis of an Euler-Bernoulli model coupled with van der Waals forces for carbon nanotubes

“…However, this model cannot be used to describe the relative vibration between adjacent tubes of MWCNTs. In 2003, it was proposed by Yoon et al [5] that the fittings of concentric tubes are considered individual beams and that the deflections of all nested tubes are coupled through the van der Waals interaction force between two adjacent tubes [8,9]. So, each of the inner and outer tubes is modeled as a beam.…”

“…where the localizing functions 𝛼 i (x) are supposed to be smooth and nonnegative, while the nonlinear functions g i (x), i = 1, • • • , 4, are continuous and monotonic increasing. Systems ( 16)-( 19) are subject to Dirichlet boundary conditions; in (8) and ( 9), Santos et al [16] showed that damping placed on an arbitrary small support, not quantized at the origin, leads to uniform (time asymptotic) decay rates for the energy function of the system.…”

Stability and regularity for double wall carbon nanotubes modeled as Timoshenko beams with thermoelastic effects and intermediate damping

“…However, this model cannot be used to describe the relative vibration between adjacent tubes of MWCNTs. In 2003, it was proposed by Yoon et al [5] that the fittings of concentric tubes are considered individual beams and that the deflections of all nested tubes are coupled through the van der Waals interaction force between two adjacent tubes [8,9]. So, each of the inner and outer tubes is modeled as a beam.…”

“…where the localizing functions 𝛼 i (x) are supposed to be smooth and nonnegative, while the nonlinear functions g i (x), i = 1, • • • , 4, are continuous and monotonic increasing. Systems ( 16)-( 19) are subject to Dirichlet boundary conditions; in (8) and ( 9), Santos et al [16] showed that damping placed on an arbitrary small support, not quantized at the origin, leads to uniform (time asymptotic) decay rates for the energy function of the system.…”

Stability and regularity for double wall carbon nanotubes modeled as Timoshenko beams with thermoelastic effects and intermediate damping

“…Para o cálculo da base dinâmica usamos a fórmula fechada dada em [4], e os autovalores λ são solução de [5,3] det…”

Cálculo das Frequências e dos Modos de Vibração de um Sistema de Duas Vigas Acopladas

“…Seibel (2013) determinou as frequências e modos de vibração de um sistema formado por duas vigas Euler-Bernoulli acopladas por uma camada viscoelástica e determinou as frequências e modos de vibração usando a base dinâmica, solução de uma equação diferencial de quarta ordem com condições impulsivas. Em Claeyssen et al (2012), os modos de vibração de um sistema composto por nanotubos de carbono acoplados através de forças de Van der Walls são escritos em termos da base dinâmica. Já em Claeyssen et al (2013) a resposta forçada para um nanotubo de carbono de uma única camada é avaliada usando a resposta impulso fundamental.…”

Frequências E Autofunções Do Sistema De Duas Cordas Acopladas