The bending problem of functionally graded Bernoulli-Euler nanobeams is analyzed starting from a nonlocal thermodynamic approach and new nonlocal models are proposed. Nonlocal expressions of the free energy are presented, the variational formulations are then consistently provided and the differential equations with the associated higher-order boundary conditions are derived. Nonlocal Eringen and gradient elasticity constitutive models are recovered by specializing the variational scheme. Examples of nanobeams are explicitly carried out, detecting thus also new benchmarks for computational mechanics.
Variational formulations for functionally graded nonlocal Bernoulli-Euler nanobeams / Barretta, Raffaele; L., Feo; R., Luciano; MAROTTI DE SCIARRA, Francesco. - In: COMPOSITE STRUCTURES. - ISSN 0263-8223. - 129:(2015), pp. 80-89. [10.1016/j.compstruct.2015.03.033]
Variational formulations for functionally graded nonlocal Bernoulli-Euler nanobeams
BARRETTA, RAFFAELE;MAROTTI DE SCIARRA, FRANCESCO
2015
Abstract
The bending problem of functionally graded Bernoulli-Euler nanobeams is analyzed starting from a nonlocal thermodynamic approach and new nonlocal models are proposed. Nonlocal expressions of the free energy are presented, the variational formulations are then consistently provided and the differential equations with the associated higher-order boundary conditions are derived. Nonlocal Eringen and gradient elasticity constitutive models are recovered by specializing the variational scheme. Examples of nanobeams are explicitly carried out, detecting thus also new benchmarks for computational mechanics.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.