Journal of Applied & Computational Mathematics

ISSN: 2168-9679

Open Access

Mohd Taib Shatnawi

Department of Mathematics, Al-Balqa Applied University, Al-Huson, Irbid, Jordan

  • Mini-Review   
    Realization of Convergence Splines/ NURBS of Higher Order Stability in Isgeometric Analysis
    Author(s): Mohd Taib Shatnawi*

    Conventional B-splines lack the capacity of local refinement that is required in order to realize ideal convergence order in genuine applications. The challenges with the isogeometric approach include the need to develop an alternative mathematical approach of higher-order equations proven to converge to the shape interface. The main purpose of this study is to determine the realization approach for isogeometric structure in convergence splines/NURBS of distinctive nature of higher-order stability. The basis for this realization approach (i.e. convergence splines/NURBS of higherorder) for B-Spline is degree (order) of realization as used in B-Spline theory. In this approach, the converging (C) order of the basis functions is elevated. An ideal (new) isogeometric structure (i.e. curve or mesh) in convergence splines/NURBS of higher-order stability for improved local.. Read More»
    DOI: 10.37421/ 2168-9679.2022.11.480

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