@article{article_421996, title={Chebyshev Wavelet collocation method for solving a class of linear and nonlinear nonlocal boundary value problems}, journal={Fundamental Journal of Mathematics and Applications}, volume={1}, pages={25–35}, year={2018}, DOI={10.33401/fujma.421996}, author={Çelik, İbrahim}, keywords={Approximate solution,Boundary-value problems,Chebyshev Wavelet,Colocation method,Nonlocal boundary conditions}, abstract={<p>This study proposes the Chebyshev Wavelet Colocation method for solving a class of rth-order Boundary-Value Problems (BVPs) with nonlocal boundary conditions. This method is an extension of the Chebyshev wavelet method to the linear and nonlinear BVPs with a class of nonlocal boundary conditions. In this study, the method is tested on second and fourth-order BVPs and approximate solutions are compared with the existing methods in the literature and analytical solutions. The proposed method has promising results in terms of the accuracy. <br /> </p> <p style="font-size:12.6px;"> <span style="font-size:14px;"> </span> </p>}, number={1}, publisher={Fuat USTA}