S. N. Pandey

Identifiers

• name variant S. N. Pandey 0.60 · backfill

Papers (15)

1. Fractal analysis of BaF2 thin films deposited on different substrates cond-mat.mtrl-sci · 2017 · author #7
2. Robustness of Greenberger-Horne-Zeilinger and W states against Dzyaloshinshkii-Moriya interaction quant-ph · 2016 · author #2
3. The inverse problem of a mixed Li\'enard type nonlinear oscillator equation from symmetry perspective nlin.SI · 2016 · author #2
4. Dynamics of entanglement in qubit-qutrit with x component of DM interaction quant-ph · 2015 · author #2
5. Influence of Dzyaloshinshkii-Moriya interaction on quantum correlations in two qubit Werner states and MEMS quant-ph · 2015 · author #2
6. Dzyaloshinskii-Moriya interaction as an agent to free the bound entangled states quant-ph · 2015 · author #2
7. Factorization technique and isochronous condition for coupled quadratic and mixed Li\'enard-type nonlinear systems nlin.SI · 2014 · author #3
8. On the complete Lie point symmetries classification of the mixed quadratic-linear Li$\acute{\textbf{e}}$nard type equation $\ddot{x}+f(x)\dot{x}^2+g(x)\dot{x}+h(x)=0$ nlin.SI · 2014 · author #2
9. Classification of Lie point symmetries for quadratic Li$\acute{\textbf{e}}$nard type equation $\ddot{x}+f(x)\dot{x}^2+g(x)=0$ nlin.SI · 2013 · author #2
10. Travelling wave solutions to nonlinear Schrodinger equation with self-steepening and self-frequency shift nlin.PS · 2009 · author #3
11. Spherically Symmetric Considerations for a Higher Order Theory of Gravitation gr-qc · 2009 · author #1
12. A Group Theoretical Identification of Integrable Equations in the Li\'enard Type Equation $\ddot{x}+f(x)\dot{x}+g(x) = 0$ : Part II: Equations having Maximal Lie Point Symmetries nlin.SI · 2009 · author #1
13. A Group Theoretical Identification of Integrable Cases of the Li\'{e}nard Type Equation $\ddot{x}+f(x)\dot{x}+g(x) = 0$ : Part I: Equations having Non-maximal Number of Lie point Symmetries nlin.SI · 2009 · author #1
14. An Electrical Spinning Particle In Einstein's Unified Field Theory gr-qc · 2006 · author #1
15. A Simple and Unified Approach to Identify Integrable Nonlinear Oscillators and Systems nlin.SI · 2005 · author #2

Mentions

• 1511.02473 #2 · backfill · confidence 0.70 S. N. Pandey
• 1501.03008 #2 · backfill · confidence 0.70 S. N. Pandey
• 1501.00942 #2 · backfill · confidence 0.70 S. N. Pandey
• 1409.1392 #3 · backfill · confidence 0.70 S. N. Pandey
• 1402.3407 #2 · backfill · confidence 0.70 S. N. Pandey
• 1302.0350 #2 · backfill · confidence 0.70 S. N. Pandey
• 0911.2788 #3 · backfill · confidence 0.70 S. N. Pandey
• 0911.0512 #1 · backfill · confidence 0.70 S. N. Pandey
• 0907.5476 #1 · backfill · confidence 0.70 S. N. Pandey
• 0907.5475 #1 · backfill · confidence 0.70 S. N. Pandey

Frequent Coauthors

• M. Lakshmanan 7 shared papers
• M. Senthilvelan 6 shared papers
• Ajey K. Tiwari 4 shared papers
• Kapil K. Sharma 4 shared papers
• V. K. Chandrasekar 3 shared papers
• B. K. Sinha 2 shared papers
• P. S. Bindu 2 shared papers
• A. C. Pandey 1 shared papers
• A. K. Mittal 1 shared papers
• Anshul Saini 1 shared papers
• Kavyashree 1 shared papers
• Manvendra Kumar 1 shared papers
• Prasanta K. Panigrahi 1 shared papers
• Raj Kumar 1 shared papers
• R. K. Pandey 1 shared papers
• R. P. Yadav 1 shared papers
• T. Solomon Raju 1 shared papers
• Vivek M. Vyas 1 shared papers