Understanding the physics of eigenvalue-eigenfunction problems: Rotating beam problem

IF 1.1 Q3 EDUCATION, SCIENTIFIC DISCIPLINES
Mehmet Pakdemirli
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引用次数: 0

Abstract

Eigenvalue-eigenfunction problems frequently appear in many physical areas. Some mathematical experience is needed to identify whether the differential system is an eigenvalue-eigenfunction problem or not. Apart from the mathematical nature of the problem, the eigenvalue-eigenfunction solutions have physical interpretations which have to be addressed properly for real problems. The rotating beam problem is treated to exploit the mathematical and physical nature of such problems and the conditions to divert from the eigenvalue-eigenfunction problem. The rotation of a beam about its symmetry axis along its length and about another axis parallel to its symmetry axis changes the nature of the problem. While the former is an eigenvalue-eigenfunction problem, the latter is not. The interpretations of the physical consequences of the solutions are discussed in detail. The problem can be used as supplementary material in undergraduate courses such as differential equations, mechanics and dynamics.
了解特征值-特征函数问题的物理原理:旋转梁问题
特征值-特征函数问题经常出现在许多物理领域。要确定微分系统是否属于特征值-特征函数问题,需要一定的数学经验。除了问题的数学性质外,特征值-特征函数解还具有物理解释,在实际问题中必须妥善处理。对旋转梁问题的处理就是要利用这类问题的数学和物理性质,以及偏离特征值-特征函数问题的条件。横梁沿其长度方向绕其对称轴旋转,以及绕平行于其对称轴的另一条轴旋转,都会改变问题的性质。前者是特征值-特征函数问题,而后者则不是。详细讨论了解的物理后果的解释。该问题可作为微分方程、力学和动力学等本科课程的补充材料。
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来源期刊
CiteScore
3.00
自引率
28.60%
发文量
13
期刊介绍: The International Journal of Mechanical Engineering Education is aimed at teachers and trainers of mechanical engineering students in higher education and focuses on the discussion of the principles and practices of training professional, technical and mechanical engineers and those in related fields. It encourages articles about new experimental methods, and laboratory techniques, and includes book reviews and highlights of recent articles in this field.
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