Publications de l'Institut Mathématique, Nouvelle SérieVol. 96[110], pp. 49–65 (2014)
|
|
Publications de l'Institut Mathématique, Nouvelle Série Vol. 96[110], pp. 49–65 (2014) |
|
|
NEW INTEGRAL REPRESENTATIONS IN THE LINEAR THEORY OF VISCOELASTIC MATERIALS WITH VOIDSA. Cialdea, E. Dolce, V. Leonessa, and A. MalaspinaDepartment of Mathematics, Computer Science and Economics, University of Basilicata, Campus of Macchia Romana, 85100 Potenza, ItalyAbstract: We investigate the two basic internal BVPs related to the linear theory of viscoelasticity for Kelvin–Voigt materials with voids by means of the potential theory. By using an indirect boundary integral method, we represent the solution of the first (second) BVP of steady vibrations in terms of a simple (double) layer elastopotential. The representations achieved are different from the previously known ones. Our approach hinges on the theory of reducible operators and on the theory of differential forms. Keywords: viscoelasticity, Kelvin–Voigt material with voids, integral equation methods Classification (MSC2000): 31B10; 35C15, 74D05 Full text of the article: (for faster download, first choose a mirror)
Electronic fulltext finalized on: 30 Oct 2014. This page was last modified: 24 Nov 2014.
© 2014 Mathematical Institute of the Serbian Academy of Science and Arts
|