Imperfection sensitivity of thin-walled I-section struts susceptible to cellular buckling

Abstract: A variational model that describes the nonlinear interaction between global and local buckling of an imperfect thin-walled I-section strut under pure compression is developed. An initial out-of-straightness of the entire strut and an initial local out-of-plane displacement in the flanges are introduced as a global and a local type of imperfection respectively. A system of differential and integral equilibrium equations is derived for the structural component from variational principles, an approach that was pr… Show more

“…where z ∈ [0, L] and the imperfection is symmetric about z/L = η. Since previous work on sandwich panels [22], I-section struts [23], stiffened plates [24] and functionally graded carbon nanotube-reinforced composite beams [52] have demonstrated that the worst case occurs when the local imperfection is symmetric about midspan, the value of η is selected to be 1/2. The quantity A 0 controls the amplitude of the imperfection component.…”

“…Even though the possible individual buckling modes taken in isolation are stable or neutral in terms of their post-buckling behaviour, the triggering of various combinations of modes simultaneously can lead to a violent destabilization after the ultimate load is reached [13,14,15,16,17]. More importantly, such structural components tend to be highly sensitive to imperfections [18,19,20,21,22,23,24,25]; a tiny imperfection may lead to a significant erosion in the load-carrying capacity.…”

“…Wadee and his collaborators have developed a series of analytical models to study the imperfection sensitivity of sandwich panels [22], stiffened plates [24] and I-section struts [23,25] that exhibit mode interaction. It has been determined that these compression members are sensitive to both local and global geometric imperfections.…”

Imperfection sensitivity of thin-walled rectangular hollow section struts susceptible to interactive buckling

“…where z ∈ [0, L] and the imperfection is symmetric about z/L = η. Since previous work on sandwich panels [22], I-section struts [23], stiffened plates [24] and functionally graded carbon nanotube-reinforced composite beams [52] have demonstrated that the worst case occurs when the local imperfection is symmetric about midspan, the value of η is selected to be 1/2. The quantity A 0 controls the amplitude of the imperfection component.…”

“…Even though the possible individual buckling modes taken in isolation are stable or neutral in terms of their post-buckling behaviour, the triggering of various combinations of modes simultaneously can lead to a violent destabilization after the ultimate load is reached [13,14,15,16,17]. More importantly, such structural components tend to be highly sensitive to imperfections [18,19,20,21,22,23,24,25]; a tiny imperfection may lead to a significant erosion in the load-carrying capacity.…”

“…Wadee and his collaborators have developed a series of analytical models to study the imperfection sensitivity of sandwich panels [22], stiffened plates [24] and I-section struts [23,25] that exhibit mode interaction. It has been determined that these compression members are sensitive to both local and global geometric imperfections.…”

Imperfection sensitivity of thin-walled rectangular hollow section struts susceptible to interactive buckling

“…This expression is derived from a leading-order solution to a multiple scale perturbation analysis of a strut on a nonlinear softening foundation, which matches the least stable localized buckling mode shape closely [22]. The quantities α and β control the degree of localization and the periodic frequency of the imperfection shape respectively and are currently chosen to match the initial local buckling eigenmode found in earlier work [23].…”

Slenderness effects in thin-walled I-section struts susceptible to local–global mode interaction

“…The interaction between individual modes can lead to a profound change in the post-buckling behaviour, even though these modes may be stable when triggered in isolation. In particular, such systems can exhibit a violent destabilization after the peak load is reached [9,10,11] and, in certain parametric ranges, have been demonstrated to be highly sensitive to initial geometric imperfections [12,13,14,15,16,17,18,19].…”

Interactive buckling in long thin-walled rectangular hollow section struts