Moduli of continuity of functions and solution of Emden-Fowler equation of third order and Chandrasekhar's white dwarf equation by Vieta-Fibonacci wavelet
DOI10.1016/J.JMAA.2024.128131WikidataQ129632792 ScholiaQ129632792MaRDI QIDQ6191126
Publication date: 6 March 2024
Published in: Journal of Mathematical Analysis and Applications (Search for Journal in Brave)
modulus of continuityorthonormal basisEmden-Fowler equation of third order and Chandrasekhar's white dwarf equationVieta-Fibonacci waveletVieta-Fibonacci wavelet approximation
Nontrigonometric harmonic analysis involving wavelets and other special systems (42C40) Inequalities in approximation (Bernstein, Jackson, Nikol'ski?-type inequalities) (41A17) Numerical methods for functional-differential equations (65L03)
Cites Work
- Special moduli of continuity and the constant in the Jackson-Stechkin theorem
- A new approach based on shifted Vieta-Fibonacci-quasilinearization technique and its convergence analysis for nonlinear third-order Emden-Fowler equation with multi-singularity
- Vieta-Fibonacci operational matrices for spectral solutions of variable-order fractional integro-differential equations
- Approximation of functions with bounded derivative and solution of Riccati differential equations by Jacobi wavelet operational matrix
- Ten Lectures on Wavelets
- Shifted Vieta‐Fibonacci polynomials for the fractal‐fractional fifth‐order KdV equation
- Vieta–Fibonacci wavelets: Application in solving fractional pantograph equations
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