TY - JOUR
T1 - A Novel Quintic B-Spline Technique for Numerical Solutions of the Fourth-Order Singular Singularly-Perturbed Problems
AU - Yousaf, Muhammad Zain
AU - Srivastava, Hari Mohan
AU - Abbas, Muhammad
AU - Nazir, Tahir
AU - Mohammed, Pshtiwan Othman
AU - Vivas-Cortez, Miguel
AU - Chorfi, Nejmeddine
N1 - Publisher Copyright:
© 2023 by the authors.
PY - 2023/10
Y1 - 2023/10
N2 - Singular singularly-perturbed problems (SSPPs) are a powerful mathematical tool for modelling a variety of real phenomena, such as nuclear reactions, heat explosions, mechanics, and hydrodynamics. In this paper, the numerical solutions to fourth-order singular singularly-perturbed boundary and initial value problems are presented using a novel quintic B-spline (QBS) approximation approach. This method uses a quasi-linearization approach to solve SSPNL initial/boundary value problems. And the non-linear problems are transformed into a sequence of linear problems by applying the quasi-linearization approach. The QBS functions produce more accurate results when compared to other existing approaches because of their local support, symmetry, and partition of unity features. This method can be applied to immediately solve the SSPPs without reducing the order in which they are presented. It has been demonstrated that the suggested numerical approach converges uniformly over the whole domain. The proposed approach is implemented on a few problems to validate the scheme. The computational results are compared, and they illustrate that the proposed approach performs better.
AB - Singular singularly-perturbed problems (SSPPs) are a powerful mathematical tool for modelling a variety of real phenomena, such as nuclear reactions, heat explosions, mechanics, and hydrodynamics. In this paper, the numerical solutions to fourth-order singular singularly-perturbed boundary and initial value problems are presented using a novel quintic B-spline (QBS) approximation approach. This method uses a quasi-linearization approach to solve SSPNL initial/boundary value problems. And the non-linear problems are transformed into a sequence of linear problems by applying the quasi-linearization approach. The QBS functions produce more accurate results when compared to other existing approaches because of their local support, symmetry, and partition of unity features. This method can be applied to immediately solve the SSPPs without reducing the order in which they are presented. It has been demonstrated that the suggested numerical approach converges uniformly over the whole domain. The proposed approach is implemented on a few problems to validate the scheme. The computational results are compared, and they illustrate that the proposed approach performs better.
KW - QBS function
KW - fourth-order BVP and IVP
KW - fourth-order Emden–fowler type equation
KW - singular singularly-perturbed non-linear initial/boundary value problems
KW - uniform convergence
UR - http://www.scopus.com/inward/record.url?scp=85175417932&partnerID=8YFLogxK
U2 - 10.3390/sym15101929
DO - 10.3390/sym15101929
M3 - Article
AN - SCOPUS:85175417932
SN - 2073-8994
VL - 15
JO - Symmetry
JF - Symmetry
IS - 10
M1 - 1929
ER -