Vibrations of thin piezoelectric flexural shells: two-dimensional approximation N Sabu Journal of elasticity 68 (1), 145-165, 2002 | 22 | 2002 |
Two-dimensional approximation of eigenvalue problems in shell theory: flexural shells S Kesavan, N Sabu Chinese Annals of Mathematics 21 (01), 1-16, 2000 | 18 | 2000 |
Vibrations of thin piezoelectric shallow shells: Two-dimensional approximation N Sabu Proceedings of the Indian Academy of Sciences-Mathematical Sciences 113, 333-352, 2003 | 13 | 2003 |
An existence theorem for generalized von Kármán equations PG Ciarlet, L Gratie, N Sabu Journal of elasticity and the physical science of solids 62, 239-248, 2001 | 13 | 2001 |
Two-dimensional approximation of eigenvalue problems in shallow shell theory S Kesavan, N Sabu Mathematics and Mechanics of Solids 4 (4), 441-460, 1999 | 13 | 1999 |
Asymptotic analysis of linearly elastic shallow shells with variable thickness N Sabu Chinese Annals of Mathematics 22 (04), 405-416, 2001 | 11 | 2001 |
Asymptotic analysis of piezoelectric shells with variable thickness N Sabu Asymptotic Analysis 54 (3-4), 181-196, 2007 | 5 | 2007 |
Deriving One-dimensional Model of Thin Elastic Rods Using Gamma Convergence N Sabu Differential Equations and Dynamical Systems 18 (3), 317-325, 2010 | 3 | 2010 |
Un théorème d'existence pour les équations de von Kármán généralisées PG Ciarlet, L Gratie, N Sabu Comptes Rendus de l'Académie des Sciences-Series I-Mathematics 332 (7), 669-676, 2001 | 2 | 2001 |
One-dimensional approximation of eigenvalue problems in thin rods S Kesavan, N Sabu Function spaces and applications, 131-142, 2000 | 2 | 2000 |
Asymptotic analysis of linearly elastic shells with variable thickness: error estimates in the membrane case J Mathai, N Sabu | | 2022 |
Two-Dimensional Approximation of Thin Piezoelectric Membrane Shells Using Gamma Convergence N Sabu Proceedings of the National Academy of Sciences, India Section A: Physical …, 2020 | | 2020 |
Lower dimensional approximation of eigenvalue problem for thin elastic shells with nonuniform thickness M Job, N Sabu | | 2020 |
Justification of the Asymptotic Analysis of Linear Slender Rods J Raja, N Sabu The Journal of the Indian Mathematical Society, 181-197, 2016 | | 2016 |
Two-Dimensional Approximation of Piezoelectric Shallow Shells with Variable Thickness J Raja, N Sabu Proceedings of the National Academy of Sciences, India Section A: Physical …, 2014 | | 2014 |
Erratum to: Justification of Koiter’s Shell Model Using Gamma Convergence N Sabu, J Raja Proceedings of the National Academy of Sciences, India Section A: Physical …, 2014 | | 2014 |
Justification of the Asymptotic Analysis of Linear Shallow Shells J Raja, N Sabu The Journal of the Indian Mathematical Society, 335-356, 2014 | | 2014 |
Justification of Koiter’s Shell Model Using Gamma Convergence N Sabu, N Raja Proceedings of the National Academy of Sciences, India Section A: Physical …, 2013 | | 2013 |
Justification of two dimensional model of shallow shells using gamma convergence J Raja, N Sabu Indian Journal of Pure and Applied Mathematics 44 (3), 277-295, 2013 | | 2013 |
EigenValue Problems in Shell Theory N Sabu University of Madras, 2009 | | 2009 |