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The properties of wavelets based on Jacobi polynomials are analyzed. The conditions are considered under which these wavelets are mutually orthogonal and under which the wavelet basis is characterized by a minimum Riesz ratio. These problems lead to the solution of systems of nonlinear equations by a method proposed earlier by the authors.
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This page is a summary of: Investigating the Orthogonality Conditions of Wavelets Based on Jacobi Polynomials, Cybernetics and Systems Analysis, July 2018, Springer Science + Business Media,
DOI: 10.1007/s10559-018-0069-1.
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