Modelization of boundary friction damping induced by second-order bending strain

“…The normalized mode shapes (w=w max ) are independent from the coefficient k m . Equation (29) shows that the gradient vector components of the total potential energy are zero. As a result, the total potential energy has a stationary or critical point at x ¼ x N and the determinant of the Hessian of the total potential energy is discriminant.…”

“…28 The Krylov-Bogoliubov linearization method is applied to estimate structural response by considering damping induced by frictional slipping in assembled structures. 29 The novel mathematical methods are used to analyze structures made up of FG materials. 30 Steady state response of FG nanobeams resting on viscous foundation to superharmonic excitation is studied.…”

Dependency of critical damping on various parameters of tapered bidirectional graded circular plates rested on Hetenyi medium

“…The normalized mode shapes (w=w max ) are independent from the coefficient k m . Equation (29) shows that the gradient vector components of the total potential energy are zero. As a result, the total potential energy has a stationary or critical point at x ¼ x N and the determinant of the Hessian of the total potential energy is discriminant.…”

“…28 The Krylov-Bogoliubov linearization method is applied to estimate structural response by considering damping induced by frictional slipping in assembled structures. 29 The novel mathematical methods are used to analyze structures made up of FG materials. 30 Steady state response of FG nanobeams resting on viscous foundation to superharmonic excitation is studied.…”

Dependency of critical damping on various parameters of tapered bidirectional graded circular plates rested on Hetenyi medium

Nonlinear dynamic modeling of a parallelogram flexure