So, the time effect of the materials can be perfectly described by applying fractional derivative analysis to some viscoelastic material, for instance, many high molecular synthetic materials.
实践已表明,将分数微积分应用于某些粘弹性材料的建模,能很好地描述材料的时间效应,如对许多高分子聚合物材料。
参考来源 - 拱的非线性动力行为研究The introduction of fractional calculus provided new tool and methods for studying viscoelasticity, corresponding study is quite lack.
将分数微积分引入本构关系为粘弹性研究带来了新的工具和方法,使粘弹性理论有了突破性发展,但相应的研究较少。
参考来源 - 聚合物应力松弛过程中的分数Maxwell模型研究·2,447,543篇论文数据,部分数据来源于NoteExpress
给予分数Hall效应以普遍的分数微积分数学形式理论描述。并给出无穷积态存在三条定理。
Fractional Hall effect is described in an universal formalized theory of fraction-dimension calculus. The three existence theorems of the fractional infinite product state are given.
是的。所有科学方向都需要学数学和微积分。如对数学不感兴趣或分数低的话,建议另选。
If you do not enjoy math, or if you have a very low mark in math, you should consider choosing another pathway.
在分数阶微积分的理论框架下,将分形动力学的机制引入到生物黏弹性本构方程的研究中。
Within the framework of the fractional calculus theory, the mechanism of fractal dynamics is introduced to the constitutive equation research of viscoelastic materials.
应用推荐