Pages that link to "Item:Q2510291"

The following pages link to Analysis of curved beams using a new differential transformation based curved beam element (Q2510291):

Displaying 15 items.

• Numerical transfer-method with boundary conditions for arbitrary curved beam elements (Q443404) (← links)
• Effects of strength difference and intermediate principal stress on plane strain elastic-plastic bending of a curved beam (Q683568) (← links)
• Developing a formulation based upon curvature for analysis of nonprismatic curved beams (Q936220) (← links)
• Bending, buckling and vibration of small-scale tapered beams (Q1625012) (← links)
• Curved beam elasticity theory based on the displacement function method using a finite difference scheme (Q1739859) (← links)
• Two kinds of \(C^0\)-type elements for buckling analysis of thin-walled curved beams (Q1971326) (← links)
• Static, stability and dynamic characteristics of asymmetric bi-directional functionally graded sandwich tapered elastic arches in thermo-mechanical environments (Q2063397) (← links)
• Analysis of general elastically end restrained non-uniform beams using differential transform (Q2284129) (← links)
• Three-dimensional vibration analysis of curved and twisted beams with irregular shapes of cross-sections by sub-parametric quadrature element method (Q2293568) (← links)
• A new approach for displacement functions of a curved Timoshenko beam element in motions normal to its initial plane (Q3425326) (← links)
• DQEM analysis of out-of-plane deflection of non-prismatic curved beam structures considering the effect of shear deformation (Q3515055) (← links)
• Free in-plane vibration of curved beam structures: A tutorial and the state of the art (Q4554652) (← links)
• Well-posedness and exponential stability of two-dimensional vibration model of a boundary-controlled curved beam with tip mass (Q5027850) (← links)
• Hybrid-mixed curved beam elements with increased degrees of freedom for static and vibration analyses (Q5435356) (← links)
• Theoretical analysis for static bending of circular Euler–Bernoulli beam using local and Eringen's nonlocal integral mixed model (Q6145914) (← links)