Abstract

AbstractGraph theory is employed in this paper as a means to establish the topological model of complex thin‐walled cross‐sections. On this basis, the upper and lower bound theorems of the plastic limit analysis are applied to the analysis of the plastic limit shear flows on the cross‐section of thin‐walled bars under St. Venant torsion. Corresponding mathematical programming problems are formulated and their duality is shown. After solving the linear programming problem corresponding to the lower bound theorem, the limit torsional moment of a thin‐walled cross‐section can be calculated according to the shear stress distribution in the limit state. The formula to calculate the limit torsional moment is given in the paper. Furthermore, the limit state of thin‐walled cross‐sections under St. Venant torsion is also discussed and a concept of the limit tree is introduced. A computer program has been developed by the author. Results calculated by the program for typical complex cross‐sections are given in the paper.

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