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Research Article | Open Access

The construction conditions of a Hilbert-type local fractional integral operator and the norm of the operator

Ling Peng1( )Qiong Liu2
School of Medical Information and Engineering, Hunan University of Medicine, Huaihua 418000, Hunan, China
School of Science and Teacher Education, Shaoyang University, Shaoyang 422000, Hunan, China
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Abstract

The parameterized local fractional singular integral operator T ( τ ) is defined on the space L p τ μ ( R + τ ) as T ( τ ) : L p τ μ ( R + τ ) L p τ ν ( 1 p ) ( R + τ ), T ( τ ) ( f τ ) ( y ) = 0 Y + ( τ ) [ | x y | τ α ( x + y ) τ β f τ ( x ) ] , y R + . By employing the weight function method and analysis techniques on the fractal real line number set R + τ , a general Hilbert-type local fractional integral inequality has been established, thereby demonstrating the boundedness of the defined integral operator. Through optimization of parameters, it was determined that the necessary and sufficient condition for the constant factor in this general Hilbert-type local fractional inequality to be the best possible is that the power parameters σ and σ 1 satisfy σ + σ 1 = β α. Consequently, the formula for calculating the operator norm has been derived.

CLC number: 26D15, 47A05

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AIMS Mathematics
Pages 1779-1791

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Cite this article:
Peng L, Liu Q. The construction conditions of a Hilbert-type local fractional integral operator and the norm of the operator. AIMS Mathematics, 2025, 10(1): 1779-1791. https://doi.org/10.3934/math.2025081

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Received: 23 September 2024
Revised: 12 January 2025
Accepted: 16 January 2025
Published: 15 January 2025
©2025 the Author(s), licensee AIMS Press.

This is an open access article distributed under the terms of the Creative Commons Attribution License (https://creativecommons.org/licenses/by/4.0)