This Article Full Text (PDF) References Alert me when this article is cited Alert me if a correction is posted Services Email this article to a friend Similar articles in this journal Alert me to new issues of the journal Add to Saved Citations Download to citation manager Request Permissions Request Reprints Add to My Marked Citations Citing Articles Citing Articles via HighWire Citing Articles via Google Scholar Citing Articles via Scopus Google Scholar Articles by Dell'Isola, F. Articles by Rosa, L. Search for Related Content Social Bookmarking                         What's this?

An Extension of Kelvin and Bredt Formulas

Luigi Rosa

Dipartimento di Ingegneria Strutturale e Geotecnica, Universit di Roma "La Sapienza," via Eudossiana 18, 1-00184 ROMA, Italia

In dell' Isola and Ruta, and dell' Isola and Rosa is suggested a "perturbative approach" (Nayfeh; Trabucho and Viaho) to the Saint-Venant problem for thin cross sections, however, the papers deal with closed cross sections or with cross sections of constant thickness only (see also Wheeler and Horgan). Here we generalize the proposed procedure by giving a method for treating the case of open or closed sections of variable thickness. We find all the known formulas (Trabucho and Viafio; Feodosyev; Chase and Chilver; Baldacci) due to Kelvin and Bredt as first non-vanishing-terms of our perturbative development and give the corrections to these formulas, too. This seems to be a first step toward solving the open problem formulated in Trabucho and Viafio, pp. 162-164.

Mathematics and Mechanics of Solids, Vol. 1, No. 2, 243-250 (1996)
DOI: 10.1177/108128659600100207


CiteULike    Complore    Connotea    Del.icio.us    Digg    Reddit    Technorati    Twitter    What's this?

This article has been cited by other articles:

				F. dell'Isola and G. C. Ruta Generalizing Jouravski Formulas by Techniques from Differential Geometry Mathematics and Mechanics of Solids, September 1, 1997; 2(3): 307 - 319. [Abstract]