TY - GEN
A1 - Alawdin, Piotr
A1 - Petrusevich, Viktoryia
A2 - Kuczyński, Tadeusz - red.
PB - Zielona Góra: Oficyna Wydawnicza Uniwersytetu Zielonogórskiego
N2 - In this paper, the mathematical model of shakedown optimization problem of limit analysis for the thin-wall metal frames under variable quasi-static loads is presented. Authors assume the elastic-plastic flexural buckling in one plane without lateral torsional buckling behavior of members on conditions of the ideal elastic-plastic behaviour of the frames materials.
N2 - According to Eurocodes requirements, the features of these frames taking into account rigidity of their foundations are described. There is problem with definition equivalent uniform moment factors for frames under variable quasi-static loads, because moment diagram is not constant. Classification of joints by stiffness was analyzed. The cases when the conditions of rigidity are not satisfied were described.
N2 - The variants of solving tasks for thin-wall metal frames have been developed, for which there is a discrepancy between the classification by stiffness of the column base and the initial design model. It?s demonstrated on the principle scheme of the iteration process. With the help of numerical example, the problems which deal with classification of joints by stiffness on the final step of the optimal design of the thin-wall metal frames were performed.
L1 - http://zbc.uz.zgora.pl/repozytorium/Content/63717/10_alawdin_limit.pdf
L2 - http://zbc.uz.zgora.pl/repozytorium/Content/63717
KW - shakedown analysis
KW - thin-wall metal frames
KW - foundations rigidity
KW - mathematical model
KW - nośność graniczna
KW - ramy cienkościenne
KW - sztywność fundamentów
KW - model matematyczny
T1 - Limit analysis of thin-wall metal frames taking into account their foundations rigidity = Analiza nośności granicznej ram cienkościennych przy uwzględnieniu sztywności ich fundamentów
UR - http://zbc.uz.zgora.pl/repozytorium/dlibra/docmetadata?id=63717
ER -