This paper presents theory, physical insight and results for mode orthogonality of piecewise continuous structures, including both coincident and non-coincident natural frequencies. The structures are ones for which exact member equations have been obtained by solving the governing differential equations, e.g. as can be done for members of plane frames or prismatic plate assemblies. Such member equations are transcendental functions of the distributed member mass and the frequency. They are used to obtain a transcendental overall stiffness matrix for the structure, from which the natural frequencies are extracted by using the Wittrick-Williams algorithm, prior to using any existing method to find the modes which are examined from the orthog...
An accurate procedure to determine free vibrations of beams and plates is presented. The natural fre...
Identification of inertia properties (mass, location of the center of mass and inertia tensor) is es...
A simple and accurate model for asymmetric, three-dimensional wall-core structures is developed that...
Transcendental stiffness matrices for vibration (or buckling) analysis have long been available for ...
The exact vibration modes and natural frequencies of planar structures and mechanisms, comprised Eul...
Transcendental stiffness matrices are well established in vibration and buckling analysis, having be...
Eigenvalues (i.e. natural frequencies or buckling load factors) of structures are usually found by t...
Transcendental stiffness matrices for vibration (or buckling) have been derived from exact analytica...
A general theory for the determination of natural frequencies and mode shapes for a set of elastical...
AbstractThis paper presents a global analysis approach to the calculation of the natural frequencies...
In another paper being presented at this symposium [1], the existence of natural frequencies and mo...
A computational procedure for extracting substructure-by-substructure flexibility properties from gl...
Exact stiffness analysis based on the Wittrick-Williams algorithm requires a solution to the governi...
The article is dedicated to the discussion on the exact dynamic stiffness matrix method applied to t...
Natural frequencies and mode shapes are important properties of engineering structures and buildings...
An accurate procedure to determine free vibrations of beams and plates is presented. The natural fre...
Identification of inertia properties (mass, location of the center of mass and inertia tensor) is es...
A simple and accurate model for asymmetric, three-dimensional wall-core structures is developed that...
Transcendental stiffness matrices for vibration (or buckling) analysis have long been available for ...
The exact vibration modes and natural frequencies of planar structures and mechanisms, comprised Eul...
Transcendental stiffness matrices are well established in vibration and buckling analysis, having be...
Eigenvalues (i.e. natural frequencies or buckling load factors) of structures are usually found by t...
Transcendental stiffness matrices for vibration (or buckling) have been derived from exact analytica...
A general theory for the determination of natural frequencies and mode shapes for a set of elastical...
AbstractThis paper presents a global analysis approach to the calculation of the natural frequencies...
In another paper being presented at this symposium [1], the existence of natural frequencies and mo...
A computational procedure for extracting substructure-by-substructure flexibility properties from gl...
Exact stiffness analysis based on the Wittrick-Williams algorithm requires a solution to the governi...
The article is dedicated to the discussion on the exact dynamic stiffness matrix method applied to t...
Natural frequencies and mode shapes are important properties of engineering structures and buildings...
An accurate procedure to determine free vibrations of beams and plates is presented. The natural fre...
Identification of inertia properties (mass, location of the center of mass and inertia tensor) is es...
A simple and accurate model for asymmetric, three-dimensional wall-core structures is developed that...