Publications


  1. SS Tomar, S Zafar, M Talha, W Gao, D Hui,  State of the art of composite structures in non-deterministic framework: a review
    Thin-Walled Structures, Accepted (2018)

  2. M Amir, M Talha, Imperfection sensitivity in the vibration behavior of functionally graded arches by considering microstructural defects
    Proceedings of the Institution of Mechanical Engineers, Part C: Journal of Mechanical Engineering Science, Accepted (2018)

  3. A Gupta, M Talha, Influence of Porosity on the Flexural and Free Vibration Responses of Functionally Graded Plates in Thermal Environment
    International Journal of Structural Stability and Dynamics, 1850013, 2018

  4. A Gupta, M Talha, Influence of initial geometric imperfections and porosity on the stability of functionally graded material plates
    Mechanics Based Design of Structures and Machines, 1-19 Accepted (2018)

  5. A Gupta, M Talha, W Seemann, Free vibration and flexural response of functionally graded plates resting on Winkler–Pasternak elastic foundations using nonpolynomial higher-order shear and normal deformation theory, Mechanics of Advanced Materials and Structures 25 (6), 523-538, 2018

  6. S S Tomar, M Talha, On the flexural and vibration behavior of imperfection sensitive higher order functionally graded material skew sandwich plates in thermal environment, Proceedings of the Institution of Mechanical Engineers, Part C: Journal of Mechanical Engineering Science, Accepted (2018)

  7. A Gupta, M Talha, Imperfection sensitivity of the post-buckling characteristics of functionally gradient plates using higher-order shear and normal deformation theory, IOP Conference Series: Materials Science and Engineering 330 (1), 012091, 2018

  8. A Gupta, M Talha, Stability characteristics of porous functionally graded plate in thermal environment, IOP Conference Series: Materials Science and Engineering 330 (1), 012011, 2018

  9. SS Tomar, M Talha, Thermo-Mechanical Buckling Analysis of Functionally Graded Skew Laminated Plates with Initial Geometric Imperfections
    International Journal of Applied Mechanics 10 (02), 1850014, 2018

  10. M Amir, M Talha, Thermoelastic Vibration of Shear Deformable Functionally Graded Curved Beams with Microstructural Defects
    International Journal of Structural Stability and Dynamics, (Accepted) 2018

  11. A Gupta, M Talha, Influence of micro-structural defects on post-buckling and large-amplitude vibration of geometrically imperfect gradient plate
    Nonlinear Dynamics, 1-18 (Accepted) 2018

  12. A Gupta, M Talha,Static and Stability Characteristics of Geometrically Imperfect FGM Plates Resting on Pasternak Elastic Foundation with Microstructural Defect, Arabian Journal for Science and Engineering, 1-17 (Accepted) 2018

  13. SS Tomar, M Talha, Large amplitude vibration analysis of functionally graded laminated skew plates in thermal environment, Mechanics of Advanced Materials and Structures, Accepted (2017)

  14. A Gupta, M Talha, Influence of Porosity on the Flexural and Free Vibration Responses of Functionally Graded Plates in Thermal Environment
    International Journal of Structural Stability and Dynamics, 18, 1850013 (2018)

  15. A Gupta, M Talha, W Seemann, Free vibration and flexural response of functionally graded plates resting on Winkler–Pasternak elastic foundations using nonpolynomial higher-order shear and normal deformation theory Mechanics of Advanced Materials and Structures, 1-16 (2017)

  16. A Gupta, M Talha, Large amplitude free flexural vibration analysis of finite element modeled FGM plates using new hyperbolic shear and normal deformation theory, Aerospace Science and Technology, 67, 287-308 (2017)

  17. A Gupta, M Talha, Nonlinear flexural and vibration response of geometrically imperfect gradient plates using hyperbolic higher-order shear and normal deformation theory, Composites Part B: Engineering, 123, 241-261 (2017)

  18. A Gupta, M Talha, Influence of porosity on the flexural and vibration response of the gradient plate using nonpolynomial higher-order shear and normal deformation theory, International Journal of Mechanics and Materials in Design, 1-20, (2017), DOI: https://doi.org/10.1007/s10999-017-9369-2

  19. A Gupta, M Talha​, An assessment of a non-polynomial based higher order shear and normal deformation theory for vibration response of gradient plates with initial geometric imperfections,Composites Part B: Engineering 107, 141-161 (2016)

  20. A Gupta, M Talha, Assessment of Second Order Normal Deformation Plate Theory For Free Vibration Analysis of Functionally Graded Plates With Mixed Boundary Constraints, International Journal of Acoustics and Vibration (Accepted)

  21. A. Gupta, A, M. Talha, M and BN Singh, Vibration characteristics of functionally graded material plate with various boundary constraints using higher order shear deformation theory, Composites Part B: Engineering,  94, 64-74 (2016)

  22. V Shah, R Kumar, M Talha, R Vaish, Piezoelectric materials for bistable energy harvester: A comparative study, Integrated ferroelectrics, 176, 73-84 (2016)

  23. A Gupta, M Talha, VK Chaudhari, Natural frequency of functionally graded plates resting on elastic foundation using finite element method, Procedia Technology, 23, 163-170 (2016)

  24. A Gupta, M Talha, Nonlinear Vibration Response of Shear Deformable Functionally Graded Plate Using Finite Element Method, Procedia Technology 23, 201-208 (2016)​

  25. V Shah, T Kumar, R Kumar, M Talha, Survey on Recent Development in Vibration Energy Harvesting using Piezoelectric Material, Journal of Basic and Applied Engineering Research, 2, 1847-1852 (2015)

  26. Gupta, A. and Talha, M., Recent development in modeling and analysis of functionally graded materials and structures,Progress in Aerospace Sciences 79, 1-14 (2015)

  27. Talha, M. and Singh, B.N., Stochastic vibration characteristics of finite element modelled functionally gradient plates",Composite structures 130, 95-106 (2015)

  28. Talha, M. and Singh, B.N., Stochastic perturbation-based finite element for buckling statistics of FGM plates with uncertain material properties in thermal environments", Composite structures 108, 823-833 (2014)

  29. Taj, G. Chakrabarti, A. and Talha, M., Bending analysis of functionally graded skew sandwich plates with through-the thickness displacement variations, Journal of Sandwich Structures and Materials, 16 ( 2), 210-248 (2014)

  30. Taj, G. Chakrabarti, A. and Talha, M., Free vibration analysis of four parameter functionally graded plates accounting transverse shear mode. Vietnam Journal of Mechanics, 36(2), 145-160 (2014)

  31. Talha, M. and Ashokkumar, C.R., Structural kinematics based damage zone prediction in gradient structures using vibration database, International Journal of Computational Materials Science and Engineering, 03, 1450007-16 (2014)

  32. Talha, M. and Singh, B.N., Thermo-mechanical deformation behavior of functionally graded rectangular plates subjected to various boundary conditions and loadings", International Journal of Aerospace and Mechanical Engineering, 6, 14-25 (2012)

  33. Talha, M. and Singh, B.N., Large amplitude free °exural vibration analysis of shear deformable FGM plates using nonlinear finite element method , Finite Element in Analysis and Design, 47, 394-401 (2011).

  34. Talha, M. and Singh, B.N., Thermo-mechanical buckling analysis of finite element modelled functionally graded ceramic-metal plates",International Journal of Applied Mechanics, 3 (4), 867-880 (2011).

  35. Talha, M. and Singh, B.N., Thermo-mechanical induced vibration characteristics of shear deformable functionally graded ceramic-metal plates using finite element method ", Proc. IMechE, Part C: J. Mechanical Engineering Science, 25, 50-65 (2011).

  36. Talha, M. and Singh, B.N., Nonlinear mechanical bending of functionally graded material plates under transverse loads with various boundary conditions", International Journal of Modeling, Simulation, and Scienti¯c Computing, 2 (2), 1-22 (2011)

  37. Talha, M. and Singh, B.N., Static response and free vibration analysis of FGM plates using higher order shear deformation theory", Applied Mathematical Modelling, 34, 3991-4011 (2010).