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DR. SHEWLI SHAMIM SHANTA
PROFESSOR
Mathematics
- Education Summary
- M.Sc.(Raj. Univ.), Ph.D.(Tokushima Univ. Japan)
- Research Interest
- Numerical Analysis of partial differential equations; Mathematical Modelling in population dynamics
| Level | Institution | Year |
|---|---|---|
| Doctoral (Ph.D.) |
Univeristy of Tokushima | 2001 |
| Masters (M.Sc.) |
Rajshahi University | 1992 |
| Bachelor/Honors (B.Sc.) |
Rajshahi University | 1991 |
| Higher Secondary (H.S.C) |
Rajshahi Education Board | 1988 |
| Secondary (S.S.C.) |
Rajshahi Education Board | 1986 |
Experience in Rajshahi University
| Duration | Organization/Institute | Position |
|---|---|---|
| 1997-07-28 to 2000-07-27 | Department of Mathematics | LECTURER |
Experience in other Organization/Institute
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Journal
| 1. |
Pinaki Dey, Razia Pervin, Md. Saidul Islam and Shewli Shamim Shanta
"Approximate solution of strongly damped nonlinear vibrations which vary with time"
Bull. Cal. Math. SOc. 111(2), 199-210
Published: February 2019
|
| 2. |
Md. Azmol Huda, M. ALi Akbar and SHewli Shamim Shanta
"The new type of wave solutions of the Burger Equation and the Benjamin-Bona-Mahony equation"
J. of Ocean Engg. & Sci. 3(1), 1-10
Published: March 2018
|
| 3. |
Md. Azmol Huda, M. Ali Akbar and Shewli Shamim Shanta
"Abundant General Solitary wave solution to the family of KdV type equations"
J. of Ocean Engg. and Sci., 1-8
Published: March 2017
|
| 4. |
Pinakee Dey, Razia Pervin and Shewli Shamim Shanta
"Approximate solution of time dependent damped nonlinear vibrating systems with slowly varying coefficients"
J. of Comp. Sci. and Math., 6(2), 101-112
Published: February 2015
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| 5. |
Pinakee Dey, Razia Pervin, Shewli Shamim Shanta Hitoshi Imai, Krishna Chandra Datta
"High precision nonlinear solution and approximate solution of over-damped nonlinear nonautonomous differential systems with varying coefficients"
Australian J. of Basic and Appl. Sci. 8(1), 567-571
Published: January 2014
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CalculusDescription Not Provided
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Classical MechanicsDescription Not Provided
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Partial Differential EquationsDescription Not Provided
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Mathematical Modelling in Population DynamicsDescription Not Provided
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