TY - JOUR
T1 - Approximate Solution to a Multi-Point Boundary Value Problem Involving Nonlocal Integral Conditions by Reproducing Kernel Method
AU - Özen, Kemal
AU - Oruçoǧlu, Kamil
PY - 2013/9
Y1 - 2013/9
N2 - In this work, we investigate a sequence of approximations converging to the existing unique solution of a multi-point boundary value problem(BVP) given by a linear fourth-order ordinary differential equation with variable coeffcients involving nonlocal integral conditions by using reproducing kernel method(RKM). Obtaining the reproducing kernel of the reproducing kernel space by using the original conditions given directly by RKM may be troublesome and may introduce computational costs. Therefore, in these cases, initially considering more admissible conditions which will allow the reproducing kernel to be computed more easily than the original ones and then taking into account the original conditions lead us to satisfactory results. This analysis is illustrated by a numerical example. The results demonstrate that the method is still quite accurate and effective for the cases with both derivative and integral conditions even if the accuracy is less compared to the cases with just derivative conditions.
AB - In this work, we investigate a sequence of approximations converging to the existing unique solution of a multi-point boundary value problem(BVP) given by a linear fourth-order ordinary differential equation with variable coeffcients involving nonlocal integral conditions by using reproducing kernel method(RKM). Obtaining the reproducing kernel of the reproducing kernel space by using the original conditions given directly by RKM may be troublesome and may introduce computational costs. Therefore, in these cases, initially considering more admissible conditions which will allow the reproducing kernel to be computed more easily than the original ones and then taking into account the original conditions lead us to satisfactory results. This analysis is illustrated by a numerical example. The results demonstrate that the method is still quite accurate and effective for the cases with both derivative and integral conditions even if the accuracy is less compared to the cases with just derivative conditions.
KW - boundary value problem
KW - differential equation
KW - nonlocal boundary condition
KW - nonlocal integral condition
KW - reproducing kernel space
UR - http://www.scopus.com/inward/record.url?scp=84885122692&partnerID=8YFLogxK
U2 - 10.3846/13926292.2013.840867
DO - 10.3846/13926292.2013.840867
M3 - Article
AN - SCOPUS:84885122692
SN - 1392-6292
VL - 18
SP - 529
EP - 536
JO - Mathematical Modelling and Analysis
JF - Mathematical Modelling and Analysis
IS - 4
ER -