Numerical Solution of Multidimensional Exponential Levy Equation by Block Pulse Function
Subject Areas : Numerical Methods in Mathematical FinanceMinoo Bakhshmohammadlou 1 , Rahman Farnoosh 2
1 - Department of Mathematics, Iran University of Science and Technology, Tehran, Iran
2 - Department of Mathematics, Iran University of Science and Technology, Tehran, Iran
Keywords:
Abstract :
[1] Merton, R.C., Option pricing when underlying stock returns are discontinuous, Journal of Financial Economic, 1976, 2, P. 125-144.
[2] Kou, S. G., A jump diffusion model for option pricing, Management Science, 2002, 48, P. 1086–1101.
[3] Glasserman, P. and Kou, S.G., The term structure of simple forward rates with jump risk, Mathematical finance, 2003, 13(3), P. 383–410.
[4] Cont, R. and Tankov, P., Financial Modelling with Jump Processes, Financial Mathematics Series, Chapman and Hall/CRC, 2004.
[5] Brummelhuis, R., Chan, RTL., A radial basis function scheme for option pricing in exponential Levy models, Applied Mathematical Finance, 2014, 21 (3). P. 238-269.
[6] Chen, X. and Wan, J., Option pricing for Time-change Exponential levy Model under MEMM, Acta Mathematicae Applicatae Sinica, English Series, 2007, 23 (4). P. 651-664.
[7] Izadikhah, M., Improving the Banks Shareholder Long Term Values by Using Data Envelopment Analysis Model, Advances in Mathematical Finance and Applications,2018, 3(2), P. 27-41. Doi: 10.22034/AMFA.2018.540829
[8] Jiang, Z.H. and Schaufelberger, W., Block Pulse Functions and Their Applications in Control Systems, Springer-Verlag, 1990.
[9] Prasada Rao, G., Piecewise Constant Orthogonal Functions and their Application to Systems and Control, Springer, Berlin, 1983.
[10] Maleknejad, K., Khodabin, M., Rostami, M., A numerical method for solving m-dimensional stochastic Ito–Volterra integral equations by stochastic operational matrix, Computers and Mathematics with Applications, 2012, 63, P. 133–143.
[11] Maleknejad, K., Khodabin, M., Rostami, M., Numerical Solution of Stochastic Volterra Integral Equations By Stochastic Operational Matrix Based on Block Pulse Functions, Mathematical and Computer Modeling, 2012, 55, P. 791–800.
[12] Khodabin, M., Maleknejad, K., Rostami, M., Numerical approach for solving stochastic Volterra-Fredholm integral equations by stochastic operational matrix, Computers and Mathematics with Applications, 2012, 64, P. 1903–1913.
[13] Maleknejad, K., Sohrabi, S., Rostami, Y., Numerical solution of nonlinear Volterra integral equations of the second kind by using Chebyshev polynomials, Applied Mathematics and Computation, 2007, 188, P. 123–128.
[14] Maleknejad, K., Rahimi, B., Modification of block pulse functions and their application to solve numerically Volterra integral equation of the first kind, Communications in Nonlinear Science and Numerical Simulation 2011, 16, P. 2469–2477.
[15] Maleknejad, K., Rahimi, B., Modification of block pulse functions and their application to solve numerically Volterra integral equation of the first kind, Communications in Nonlinear Science and Numerical Simulation 2011, 16, P. 2469–2477.
[16] Maleknejad, K., Safdari, H., Nouri, M., Numerical solution of an integral equations system of the first kind by using an operational matrix with block pulse functions, International Journal of Systems Science, 2011, 42, P. 195–199.
[17] Zhang, X., Stochastic Volterra equations in Banach spaces and stochastic partial differential equation, Journal of Functional Analysis, 2010, 258, P. 1361–1425.
[18] Manafian, J. and Bolghar, P., Numerical solutions of nonlinear 3‐dimensional Volterra integral‐differential equations with 3D‐block‐pulse functions, Mathematical Methods in the Applied Sciences, 2018, 41 (12), P. 4867-4876.
[19] Safavi, M., Khajehnasiri, A.A., Angelamaria Cardone, A., Numerical solution of nonlinear mixed Volterra-Fredholm integro-differential equations by two-dimensional block-pulse functions, Cogent Mathematics and Statistics, 2018, 2 (1), P. 1-13.
[20] Yonthanthum, W., Rattana, A., Razzaghi, M., An approximate method for solving fractional optimal control problems by the hybrid of block‐pulse functions and Taylor polynomials, Optimal Control Applications and Methods, 2018, 39 (2), P. 873-887.
[21] Lee, J. and Kim, Y., Sampling methods for NTR processes, in Proceedings of International Workshop for Statistics (SRCCS ’04), Lecture Note, Seoul, Korea, 2004.
