摘要
标准的整数阶导数方程不能准确描述粘弹性材料的记忆性[1]和阻尼的分数次幂频率依赖[2],因此分形导数、分数阶导数及正定分数阶导数被用于描述粘弹性介质中的阻尼振动.该文通过分析模型和数值模拟,比较了三种模型描述的振动过程.结果显示,当p小于约0.75或大于约1.9时(p为非整数阶导数的阶数),分形导数模型衰减最快;当p大于约0.75且小于约1.9时,正定分数阶导数模型衰减最快,衰减最慢的分别为分数阶导数模型(p<1)和分形导数模型(p>1).且正定分数阶导数模型衰减快于分数阶导数模型,当p接近2时,两种模型较为相近.
The standard integer order differential equation can't be used to describe the memory mechanics behavior and the power-law frequency-denpendent damping of the viscoelastic materials, so the fractal derivative, the fractional derivative and the positive fractional derivative is employed to depict the damped oscillation in the viscoelastic medium. This study compared the oscillation by these three models by analyzing models and numerical simulating motion of the oscillator. Results show that the damped oscillation by the fractal derivative model decays most fast when p (p is the order of the non-integer order derivative) is smaller than about 0.75 or bigger than about 1.9; the positive fractional derivative model decays most fast when p is bigger than about 0.75 and smaller than about 1.9, and the slowest one is the fractional derivative model (p〈1) or the fractal derivative model (p〉1). Moreover, the damped oscillation modeled by the positive fractional derivative model gains more dissipation than the fractional derivative model, which are very similar with p close to 2.
出处
《固体力学学报》
CAS
CSCD
北大核心
2009年第5期496-503,共8页
Chinese Journal of Solid Mechanics
基金
中国科学院“声场与声信息国家重点实验室”开放基金项目
国家自然科学基金项目(10774038)资助
关键词
阻尼振动
粘弹性
分形导数
分数阶导数
正定分数阶导数
damped oscillation, viscoelasticity, fractal derivative, fractional derivative, positive fractional derivative
