Semi-orthogonal Tribonacci Wavelets and Numerical Solutions of Nonlinear Singular BVPs Arising in a Chemical Reaction

Ankita Yadav; Amit K. Verma

arXiv:2506.14814·math.NA·June 19, 2025

Semi-orthogonal Tribonacci Wavelets and Numerical Solutions of Nonlinear Singular BVPs Arising in a Chemical Reaction

Ankita Yadav, Amit K. Verma

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TL;DR

This paper introduces semi-orthogonal tribonacci wavelets and a collocation method to effectively solve nonlinear singular boundary value problems in chemical reaction models.

Contribution

The paper develops a novel semi-orthogonal tribonacci wavelet and a collocation method for nonlinear singular BVPs, expanding numerical tools for complex chemical reaction equations.

Findings

01

Effective numerical solutions for nonlinear singular BVPs

02

Enhanced accuracy with semi-orthogonal tribonacci wavelets

03

Applicable to chemical reaction boundary problems

Abstract

In this article, we introduce a semi-orthogonal tribonacci wavelet and develop a semi-orthogonal tribonacci wavelet collocation method, offering an effective numerical method for solving a class of non-linear singular BVPs.

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Taxonomy

TopicsElasticity and Wave Propagation · Nonlinear Waves and Solitons · Advanced Mathematical Theories and Applications