A selective review of direct, semi-inverse and inverse eigenvalue problems for structures described by differential equations with variable coefficients
- Autores: Isaac Elishakoff
- Localización: Archives of computational methods in engineering: state of the art reviews, ISSN 1134-3060, Vol. 7, Nº. 4, 2000, págs. 451-526
- Idioma: inglés
- DOI: 10.1007/bf02736214
- Texto completo no disponible (Saber más ...)
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Resumen
This selective review (with emphasis on the word �selective�) gives only a taste of extensive research that has been conducted since 1759 when Leonhard Euler posed, apparently for the first time, a boundary value problem. Since then numerous studies have been conducted for rods, Bernoulli-Euler beams, Bresse-Timoshenko beams, Kirchhoff-Love and Mindlin-Reissner plates and shells and structures analyzed via finer, higher-order theories. This selective review classifies the solutions as belonging to either of three main classes: (1) direct problems, (2) semi-inverse problems, (3) inverse problems. In addition, some new closed-form solutions are reported, that have been obtained via posing an inverse vibration problem. Due to the huge body of literature, author limits himself with discussing classic theories of structures
