A generalized Chebyshev operational method for Volterra integro-partial differential equations with weakly singular kernels
Khadijeh Sadri,
David Amilo,
Evren Hinçal,
Kamyar Hosseini,
Soheil Salahshour
Affiliations
Khadijeh Sadri
Department of Mathematics, Near East University TRNC, Mersin 10, Nicosia 99138, Turkey; Mathematics Research Center, Near East University TRNC, Mersin 10, Nicosia 99138, Turkey; Faculty of Art and Science, University of Kyrenia, Kyrenia, TRNC, Mersin 10, Turkey; Corresponding authors at: Mathematics Research Center, Near East University TRNC, Mersin 10, Nicosia 99138, Turkey.
David Amilo
Department of Mathematics, Near East University TRNC, Mersin 10, Nicosia 99138, Turkey; Mathematics Research Center, Near East University TRNC, Mersin 10, Nicosia 99138, Turkey; Faculty of Art and Science, University of Kyrenia, Kyrenia, TRNC, Mersin 10, Turkey
Evren Hinçal
Department of Mathematics, Near East University TRNC, Mersin 10, Nicosia 99138, Turkey; Mathematics Research Center, Near East University TRNC, Mersin 10, Nicosia 99138, Turkey; Faculty of Art and Science, University of Kyrenia, Kyrenia, TRNC, Mersin 10, Turkey
Kamyar Hosseini
Department of Mathematics, Near East University TRNC, Mersin 10, Nicosia 99138, Turkey; Mathematics Research Center, Near East University TRNC, Mersin 10, Nicosia 99138, Turkey; Faculty of Art and Science, University of Kyrenia, Kyrenia, TRNC, Mersin 10, Turkey; Department of Computer Science and Mathematics, Lebanese American University, Beirut, Lebanon; Corresponding authors at: Mathematics Research Center, Near East University TRNC, Mersin 10, Nicosia 99138, Turkey.
Soheil Salahshour
Faculty of Engineering and Natural Sciences, Istanbul Okan University, Istanbul, Turkey; Faculty of Engineering and Natural Sciences, Bahcesehir University, Istanbul, Turkey; Faculty of Science and Letters, Piri Reis University, Tuzla, Istanbul, Turkey
Volterra integro-partial differential equations with weakly singular kernels (VIPDEWSK) are utilized to model diverse physical phenomena. A matrix collocation method is proposed for determining the approximate solution of this functional equation category. The method employs shifted Chebyshev polynomials of the fifth kind (SCPFK) to construct two-dimensional pseudo-operational matrices of integration, avoiding the need for explicit integration and thereby speeding up computations. Error bounds are examined in a Chebyshev-weighted space, providing insights into approximation accuracy. The approach is applied to several experimental examples, and the results are compared with those obtained using the Bernoulli wavelets and Legendre wavelets methods.
