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相关概念视频

Mohr's Circle for Plane Strain01:18

Mohr's Circle for Plane Strain

458
Mohr's circle is a crucial graphical method used to analyze plane strain by plotting strain on a set of cartesian coordinates, where the abscissa is normal strain ∈ and the ordinate is shear strain γ. Similarly to Mohr’s circle for plane stress, two points X and Y are plotted. Their coordinates are (∈x, -γXY) and (∈Y, γXY), respectively.
Mohr's circle visually represents the strain states under various conditions, which is essential for...
458
Divergence and Stokes' Theorems01:06

Divergence and Stokes' Theorems

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The divergence and Stokes' theorems are a variation of Green's theorem in a higher dimension. They are also a generalization of the fundamental theorem of calculus. The divergence theorem and Stokes' theorem are in a way similar to each other; The divergence theorem relates to the dot product of a vector, while Stokes' theorem relates to the curl of a vector. Many applications in physics and engineering make use of the divergence and Stokes' theorems, enabling us to write...
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Three-Dimensional Analysis of Strain01:29

Three-Dimensional Analysis of Strain

203
Three-dimensional strain analysis is crucial for understanding how materials deform under stress, particularly in elastic, homogeneous materials. This method employs principal stress axes to simplify complex stress states into more understandable forms. Subjected to stress, a small cubic element within a material either expands or contracts along these axes, transforming into a rectangular parallelepiped. This transformation effectively illustrates the material's deformation. The principal...
203
Parallel-axis Theorem01:06

Parallel-axis Theorem

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The parallel-axis theorem provides a convenient and quick method of finding the moment of inertia of an object about an axis parallel to the axis passing through its center of mass. Consider a thin rod as an example. There is a striking similarity between the process of finding the moment of inertia of a thin rod about an axis through its middle, where the center of mass lies, and about an axis through its end using the conventional method. In the conventional method, the concept of linear mass...
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Vector Algebra: Graphical Method01:10

Vector Algebra: Graphical Method

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Vectors can be multiplied by scalars, added to other vectors, or subtracted from other vectors. The vector sum of two (or more) vectors is called the resultant vector or, for short, the resultant.
We use the laws of geometry to construct resultant vectors, followed by trigonometry to find vector magnitudes and directions. For a geometric construction of the sum of two vectors in a plane, we follow the parallelogram rule. Suppose two vectors are at arbitrary positions. Translate either one of...
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Mohr's Circle for Plane Stress01:23

Mohr's Circle for Plane Stress

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Mohr's circle is a graphical method for identifying the state of stress at a point in a material, making it easier to analyze stress transformations under plane stress conditions. This two-dimensional technique visualizes both normal and shearing stresses on an element.
Consider a set of Cartesian coordinates. The horizontal and vertical axes correspond to normal stress (σ) and shearing stress (τ), respectively. Two points, points A and B, are defined by the normal and shear...
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相关实验视频

Updated: Jun 5, 2025

Longitudinal Measurement of Extracellular Matrix Rigidity in 3D Tumor Models Using Particle-tracking Microrheology
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多环斯多项式和持久斯多项式用于结节数据分析.

Ruzhi Song1,2, Fengling Li1, Jie Wu2

  • 1School of Mathematical Sciences, Dalian University of Technology, Dalian 116024, China.

ArXiv
|December 9, 2024
PubMed
概括

本研究介绍了分析曲线纠的本地化模型,以实际应用的本地结构信息来增强节点理论. 新的多尺度和持久的斯多项式模型为复杂曲线提供了强大的分析.

关键词:
57K1414 这是一个很好的选择.92C1010 它们是什么?斯的多项式是一个多项式.结节数据分析数据分析曲线数据分析数据分析曲线在本地化,本地化.蛋白质灵活性 蛋白质的灵活性稳定的稳定性 稳定的稳定性

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科学领域:

  • 拓学的拓学
  • 材料科学 材料科学 材料科学
  • 应用数学 应用数学 应用数学

背景情况:

  • 在3D空间中复杂的曲线是科学,工程和艺术的基础.
  • 曲线纠显著影响材料的性能和功能.
  • 经典结结理论缺乏局部结构分析,限制了实际应用.

研究的目的:

  • 开发局部化的模型来分析曲线纠.
  • 将局部结构信息纳入结结理论.
  • 为了提高结理论的实际应用性.

主要方法:

  • 提出了两个本地化模型:多尺度的斯多项式和持久的斯多项式.
  • 利用结结理论和多项式不变数的概念.
  • 分析了对小扰动的模型稳定性.

主要成果:

  • 介绍了用于局部曲线分析的多尺度斯多项式.
  • 开发了持久的斯多项式,也专注于局部属性.
  • 证明了这些新型号的稳定性和强度.

结论:

  • 局部化模型为曲线纠提供了关键的局部结构信息.
  • 多尺度和持久的斯多项式为现实世界的应用提供了强大的工具.
  • 这些进步弥合了理论结结理论和实际结构分析之间的差距.