Items where Author is "Shearer, Tom"
De Pascalis, Riccardo and Parnell, William J. and Abrahams, I. David and Shearer, Tom and Daly, Donna M. (2018) The inflation of viscoelastic balloons and hollow viscera. Proceedings of the Royal Society A, 474. p. 20180102. ISSN 1364-5021
Balbi, Valentina and Shearer, Tom and Parnell, William J. (2018) A modified formulation of quasi-linear viscoelasticity for transversely isotropic materials under finite deformation. Proceedings of the Royal Society A, 474. p. 20180231. ISSN 1364-5021
Shearer, Tom and Parnell, William J. and Abrahams, I. David (2015) Antiplane wave scattering from a cylindrical cavity in pre-stressed non-linear elastic media. Proceedings of the Royal Society A. ISSN 1471-2946
Shearer, Tom (2015) A new strain energy function for modelling ligaments and tendons whose fascicles have a helical arrangement of fibrils. Journal of Biomechanics. ISSN 0021-9290 (In Press)
Shearer, Tom (2015) A new strain energy function for modelling ligaments and tendons whose fascicles have a helical arrangement of fibrils. Journal of Biomechanics, 48. pp. 3017-3025. ISSN 0021-9290
Shearer, Tom (2014) A new strain energy function for the hyperelastic modelling of ligaments and tendons based on fascicle microstructure. Journal of Biomechanics. ISSN 0021-9290
Shearer, Tom (2014) A new strain energy function for the hyperelastic modelling of ligaments and tendons based on fascicle microstructure. Journal of Biomechanics, 48. pp. 290-297. ISSN 0021-9290
Shearer, Tom and Abrahams, I. David and Parnell, William J. and Daros, Carlos H. (2013) Torsional wave propagation in a pre-stressed hyperelastic annular circular cylinder. The Quarterly Journal of Mechanics and Applied Mathematics, 66 (4). pp. 465-487.
Parnell, William J. and Shearer, Tom (2013) Antiplane elastic wave cloaking using metamaterials, homogenization and hyperelasticity. Wave Motion, 50. pp. 1140-1152. ISSN 0165-2125
Parnell, William J. and Norris, Andrew N. and Shearer, Tom (2012) Employing pre-stress to generate finite cloaks for antiplane elastic waves. Applied Physics Letters. (In Press)