Abstract
The torsion of beams of L-cross-section was studied for the first time, from a mathematical standpoint, by Kotter [1]. He solved the problem in the case of an L-section both arms of which are infinite. Some time later, Trefftz [2], in his work on the torsion of beams of polygonal cross-section, applied his method also to an infinite L-section. In 1934, Seth [3] solved the case of a beam of an L-section with only one infinite arm. In 1949, Arutyanyan [4] solved the torsion problem of an L-section that has both arms finite, but of equal length, reducing the problem to that of solving an infinite system of equations.
Publisher
Cambridge University Press (CUP)
Subject
Applied Mathematics,General Mathematics
Reference5 articles.
1. Solution of the problem of the torsion of a rod with a polygonal cross section;Arutyunyan;Prikl. Mat. Meh.,1949
2. Torsion of beams of ⊥- and ∟- cross-sections
3. 1. Kötter K. , Über die Torsion des Winkeleisens, S. -B. Kgl. Preuss. Akad. Wiss., Math.-Phys. Klasse (1908), 935–955.
4. Über die Torsion prismatischer Stäbe-von polygonalem Querschnitt
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