A. Arbind, J. N. Reddy, and A. R. Srinivasa. A general higher-order shell theory for compressible isotropic hyperelastic materials using orthonormal moving frame ." International Journal for Numerical Methods in Engineering,122(1), 235-269. (2020). (Link)

Arbind, A., J. N. Reddy, and A. R. Srinivasa. "A nonlinear 1-D finite element analysis of rods/tubes made of incompressible neo-Hookean materials using higher-order theory." International Journal of Solids and Structures 166 (2019): 1-21.  (Link)

Arbind, A., A. R. Srinivasa, and J. N. Reddy. "A higher-order theory for open and closed curved rods and tubes using a novel curvilinear cylindrical coordinate system." Journal of Applied Mechanics 85, no. 9 (2018): 091006.  (Link)

Arbind, A., and J. N. Reddy. "A one-dimensional model of 3-D structure for large deformation: a general higher-order rod theory." Acta Mechanica 229, no. 4 (2018): 1803-1831.  (Link)

Arbind, A., and J. N. Reddy. "Correction to: A one-dimensional model of 3-D structure for large deformation: a general higher-order rod theory." Acta Mechanica 229, no. 10 (2018): 4313-4317.  (Link)

Arbind, A., and J. N. Reddy. "A general higher-order one-dimensional model for large deformation analysis of solid bodies." Computer Methods in Applied Mechanics and Engineering 328 (2018): 99-121.  (Link)

Arbind, A., J. N. Reddy, and A. R. Srinivasa. "Nonlinear Analysis of Plates with Rotation Gradient–Dependent Potential Energy for Constrained Microrotation." Journal of Engineering Mechanics 144, no. 2 (2017): 04017180. (Link)

Arbind, A., J. N. Reddy, and A. R. Srinivasa. "Nonlinear analysis of beams with rotation gradient dependent potential energy for constrained micro-rotation." European Journal of Mechanics-A/Solids 65 (2017): 178-194. (Link)

Arbind, A., and J. N. Reddy. "Transient analysis of Cosserat rod with inextensibility and unshearability constraints using the least-squares finite element model." International Journal of Non-Linear Mechanics 79 (2016): 38-47. (Link)

Arbind, A., J. N. Reddy, and A. R. Srinivasa. "Modified couple stress-based third-order theory for nonlinear analysis of functionally graded beams." Latin American Journal of Solids and Structures 11, no. 3 (2014): 459-487. (Link)

Arbind, A., and J. N. Reddy. "Nonlinear analysis of functionally graded microstructure-dependent beams." Composite Structures 98 (2013): 272-281. (Link)

Reddy, J. N., A. Srinivasa, A. Arbind, and P. Khodabakhshi. "On gradient elasticity and discrete peridynamics with applications to beams and plates." In Advanced Materials Research, vol. 745, pp. 145-154. Trans Tech Publications, 2013. (Link)

Reddy, J. N., and Arbind, A. "Bending relationships between the modified couple stress-based functionally graded Timoshenko beams and homogeneous Bernoulli–Euler beams." Annals of Solid and Structural Mechanics 3, no. 1-2 (2012): 15-26. (Link)

A. Arbind, J. N. Reddy, and A. R. Srinivasa.  A one-dimensional model for large deformation analysis of 3D structures: an application of the general higher order rod theory to nonlinear material." Session: Novel Mathematical Models and Computational Methods, 13th World Congress in Computational Mechanics and 2nd Pan American congress on computational mechanics, 2018, New York city, NY, USA.

A. Arbind, J. N. Reddy, and A. R. Srinivasa. A Novel General Higher-order Shell Theory for Compressible and Incompressible Hyperelastic Materials Using Orthonormal Moving Frame." 15th U.S. National Congress on Computational Mechanics, July 2019, Austin, TX, USA.

A. Arbind. A General Higher-Order Shell Theory for incompressible and anisotropic hyperelastic  materials using Orthonormal Moving Frame: application to arterial mechanics", 15th World Congress in Computational Mechanics, August 2022, Yokohama, Japan.

A. Arbind, General higher-order one dimensional and shell theories for pipe like soft structures using orthonormal's moving frame", ACMFMS 2022, IIT Guwahati, December 2022. (Invited talk and chair session)