Source: https://iitbhu.ac.in/dept/mat/people/vksinghapm
Timestamp: 2019-04-18 15:28:09+00:00

Document:
Ph. D.: Department of Mathematical Sciences, Indian Institute of Technology (BHU) Varanasi.
M. Sc. Mathematics: Udai Pratap Autonomous College Varanasi.
B. Sc. Mathematics: Udai Pratap Autonomous College Varanasi.
Post-Doc Fellow ( BOYSCAST Fellow awarded by Department of Science and Technology, India) : Kursk State University, Kursk, Russia.
Associate Professor in Department of Mathematical Sciences, Indian Institute of Technology (BHU) Varanasi: July 19, 2017-till date.
1. Associate Professor in Department of Mathematical Sciences, Indian Institute of Technology (BHU) Varanasi: July 19, 2017-till date.
2. Assistant Professor in Department of Mathematical Sciences, Indian Institute of Technology (BHU) Varanasi: December 24, 2013 -July 18, 2017.
3. Assistant Professor in Department of Mathematics at National Institute of Technology, Kurukshetra since November 19, 2013 - December 23, 2013.
4. Assistant Professor in Department of Mathematics at Birla Institute of Technology and Science, Pilani (BITS-Pilani)-Goa Campus, Goa from: June 29, 2009 to November 18, 2013.
Numerical Wavelets Method for Integral Equations and Differential Equations.
V. K. Singh, O. P. Singh, R. K. Pandey, Efficient algorithms to compute Hankel transform using wavelets, Computer Physics Communications, 179 (2008) 812-818.
V. K. Singh, O. P. Singh, R. K. Pandey, Numerical evaluation of Hankel transforms by using linear Legendre multi-wavelets, Computer Physics Communications179 (2008) 424-429.
V. K. Singh, R. K. Pandey, O. P. Singh, New stable numerical solutions of singular integral equations of Abel type by using normalized Bernstein polynomials, Applied Mathematical Sciences, Vol. 3 No. 5 (2008)441-455.
R. K. Pandey, O. P. Singh, V. K. Singh, An efficient algorithm for computing zero- order Hankel transforms, Applied Mathematical Sciences, Vol. 2 No.60(2008)2991-3000.
A. K. Singh, V. K. Singh , O. P. Singh, Bernstein operational matrix of integration, Applied Mathematical Sciences, Vol. 3, 2009, no. 49, 2427-2436.
R. K. Pandey, O. P. Singh, V.K. Singh, Efficient algorithms to solve singular integral equations of Abel type, Computer & Mathematics with Applications, 57(4) (2009) 664- 676.
R. K. Pandey, V. K. Singh, O. P. Singh, An improved method for computing Hankel transform, Journal of The Franklin Institute, 346 (2)(2009) 102-111.
O. P. Singh, R.K.Pandey, V. K. Singh, An analytic algorithm for Lane -Emden equations arising in Astrophysics using MHAM, Computer Physics Communications, 180 (2009) 1116-1124.
O. P. Singh, V. K. Singh, R. K. Pandey, A New Stable Algorithm for Abel inversion Using Bernstein Polynomials, International Journal of Nonlinear Sciences and Numerical Simulation, 10 (5) (2009) 681-685.
R. K. Pandey, O. P. Singh, V. K. Singh, Numerical solution of system of Volterra integral equations using Bernstein polynomials, International Journal of Nonlinear Sciences and Numerical Simulation 10 (7) (2009) 691-695.
O. P. Singh, V. K. Singh, R. K. Pandey, New stable numerical inversion of Abel's integral equation using almost Bernstein operational, Journal of Quantitative Spectroscopy and Radiative Transfer, 111 (2010) 245-252.
V. K. Singh, R. K. Pandey, A Stable Algorithm for Hankel transform using hybrid of Block pulse and Legendre polynomials, Computer Physics Communications181 (2010) 1-10 .
R. K. Pandey, O. P. Singh, V. K. Singh., A Stable Algorithm for Numerical evaluation of Hankel transforms using Haar wavelet, Numerical Algorithms 53(4) (2010) 451-466.
V. K. Singh, O. P. Singh, R. K. Pandey, Almost Bernstein Operational Matrix Method For Solving Systems of Volterra Integral Equations of Convolution Type, Non Linear Sciences Letters A, 1 (2) (2010) 201-206.
R. K. Pandey, V. K. Singh, O. P. Singh, A New Stable Algorithm for Hankel transform using Chebyshev Wavelets, Communications in Computational Physics 8(2) (2010) 351-373.
R. K. Pandey, O. P. Singh, V. K. Singh, D. Singh, Numerical evaluation of Hankel transforms using Haar wavelets, International Journal of Computer Mathematics 87 (11) (2010) 2568-2573.
O. P. Singh, V. K. Singh, R. K. Pandey, An efficient and stable algorithm for numerical evaluation of Hankel transforms, Journal of Applied Mathematics & Informatics 28 (5-6) (2010) 1055-1071.
S. Dixit, V. K. Singh, A. K. Singh, O. P. Singh, Bernstein direct method for solving variational problems, International Mathematical Forum, Vol. 5, No (48), 2010, 2351-2370.
D. Singh, R. K. Misra, V. K. Singh, R. K. Pandey, Bad data pre-filter for state estimation, Electrical power and energy systems, Vol. 32 (2010) 1165-1174.
E. B. Postnikov, V.K. Singh, Local spectral analysis of images via the wavelet transform based on partial differential equations, Multidimensional system and signal analysis, DOI 10.1007/s11045-012-0196-1.
V. K. Singh, E. B. Eugene, Operational Matrix Approach for Solution of Integro-Differential Equation Arising in Theory of Anomalous Relaxation Processes in Vicinity of Singular Point, Applied Mathematica Modelling, 37(2013)6609-6616.
E. B. Postnikov, V. K. Singh, Continuous wavelet transform with the Shannon wavelet from the point of view of hyperbolic partial differential equations, Analysis Mathematica, 51 (2015) 199-206.
S. Singh, V. K. Patel, V. K. Singh, Operational matrix approach for the solution of partial integro-differential equation, Applied Mathematics and Computation, 283 (2016), 195-207.
C. S. Singh, H. Singh, V. K. Singh, Om P. Singh, Fractional order operational matrix methods for fractional singular integro-differential equation, Applied Mathematical Modelling, 40 (2016)10705-10718.
S. Singh, V. K. Patel, V. K. Singh, E. Tohidi, Numerical Solution of Nonlinear weakly Singular Partial Integro-differential Equation via Operational Matrices, Applied Mathematics and Computation, Vol. 298 (2017), 310-321.
V. K. Patel, S. Singh, V. K. Singh, Two-Dimensional Wavelets Collocation Method for Electromagnetic Waves in Dielectric Media, J. Appl. Math. Comput., Vol. 317 ( 2017), 307-330.
V. K. Patel, S. Singh, V. K. Singh, Two-Dimensional Shifted Legendre Polynomial Collocation Method for Electromagnetic Waves in Dielectric Media via Almost Operational Matrices, Mathematical Methods in the Applied Sciences, Vol. 40 (2017), 3698-3717.
S. Singh, V. K. Patel, V. K. Singh, Application of wavelet collocation method for hyperbolic partial differential equation via matrices, Applied Mathematics and Computation, 320 (2018) 407–424.
S. Singh, V. K. Patel, V. K. Singh, E. Tohidi, Application of Bernoulli matrix method solving two-dimensional hyperbolic telegraph equation with Dirichlet boundary conditions, Computer and Mathematics with Applications, https://doi.org/ 10.1016/j.camwa. 2017.12.003.
S. Singh, V. K. Patel, V. K. Singh, A Study on Convergence rate of Collocation Method based on Wavelet for Nonlinear weakly Singular Partial Integro-differential Equation Arising from Viscoelasticity, Numerical Methods for Partial Differential Equations, DOI: 10.1002/num.22245.
V. K. Patel, V. K. Singh, E. B. Postnikov, Application of Piecewise Expansion based on 2D Legendre Wavelets for Fractional Partial Differential Equation, International Journal of Pure and Applied Mathematics, 119 (2018), 5159-5167.
V. K. Patel, S. Singh, V. K. Singh, E. Tohidi, Two Dimensional Wavelets Collocation Scheme for Linear and Nonlinear Volterra Weakly Singular Partial Integro-Differential Equations, International J. of Applied and Computational Mathematics, https://doi.org/10.1007/s40819-018-0560-4.
2. V. K. Singh, ” Numerical method for system of singular Voltera integro-differential equations.” August 13-21, 2014, International Congress of Mathematicians ( ICM-2014 ) , COEX, SEOUL, South Korea.
3. S. Singh, V. K. Singh, “Application of operational matrices based on orthogonal polynomials for the numerical solution of partial differential equation” in the international conference Operator Theory, Analysis, Mathematical Physics (OTAMP)" held at St. Petersburg, Russia, August 2-7, 2016.
4. S. Singh, V. K. Singh, “Application of operational matrices for the numerical solution of partial differential equations” in the International Conference on Mathematical Modeling and Simulation, (ICMMS-2016), held at Banaras Hindu University, Varanasi, August 29-31, 2016.
6. S. Singh, V. K. Singh, “Application of Chebyshev wavelet approximation for nonlinear partial differential equations arising from viscoelasticity” in the international conference “Constructive nonsmooth analysis and related topics” held at St. Petersburg, Russia, May 22-27, 2017.
7. S. Singh, V. K. Singh, “An efficient computational technique for the numerical solution of matrix hyperbolic equations of first order” in the “International Conference on Mathematical Modeling and Applied Sciences, ICMMAS'2017” held at St. Petersburg, Russia, July 24-28, 2017.
8.V. K. Patel, V. K. Singh, E. B. Postnikov, "Application of piecewise expansion based on 2D Legendre wavelets for fractional partial differential equation" in the international conference on computational methods, simulation and optimization (ICCMSO-2018) held at Asian Institute of Technology. Bangkok, Thailand from June 22, 2018 to June 24, 2018.
Somveer Singh : Numerical methods based on wavelets and operational matrices for partial differential equations and integral equations.
Vijay Kumar Patel : Applications of wavelets and operational matrices for partial differential equations and singular integral equations.
Vipul Sharma, 2015: A study on wavelet based feature extraction techniques for text independent automatic speaker verification.
Saurabh Kumar, 2015: Multi-wavelet and polynomial techniques for numerical solution of integro-differential equations.
Shreya Singh, 2016: Numerical methods to solve Hankel transform.
Rahul Singh Pahrwa, 2016: Numerical solutions for partial differential equations.
Warden of Morvi Hostel, IIT (BHU) Varanasi.
Member of the users committee for GRTA, IIT (BHU) Varanasi.
Faculty In-Charge of the Department during institute day, IIT(BHU) Varanasi.
Member of the DUGC, IIT(BHU) Varanasi.
Member of the DPGC, IIT(BHU) Varanasi.
Coordinator, Workshop on wavelets and their application in signal and image processing, December 21 - 25, 2017, Department of Mathematical Sciences, IIT (BHU) Varanasi, India (funded by MHRD, Govt. of India, under GIAN scheme).
1. Annual Foundation School (AFS II-2006 Pune) supported by TIFR &NBHM.
2. Instructional workshop on Wavelets Analysis , Dept. of Mathematics Banaras Hindu University Sponsored by DST New Delhi Oct 22 to Nov.5, 2007.
Short Visit : July 27-August 9, 2016, at Kursk State University, Kursk, Russia.

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