Research article

Boundedness of an intrinsic square function on grand $ p $-adic Herz-Morrey spaces

  • Received: 10 July 2023 Revised: 25 August 2023 Accepted: 05 September 2023 Published: 15 September 2023
  • MSC : 42B35, 26D15, 46B25, 47G10

  • This research paper focuses on establishing a framework for grand Herz-Morrey spaces defined over the $ p $-adic numbers and their associated $ p $-adic intrinsic square function. We will define the ideas of grand $ p $-adic Herz-Morrey spaces with variable exponent $ {M\dot{K} ^{\alpha, u), \theta}_{ s(\cdot)}(\mathbb{Q}^n_p)} $ and $ p $-adic intrinsic square function. Moreover, the corresponding operator norms are estimated. Grand $ p $-adic Herz-Morrey spaces with variable exponent is the generalization of $ p $-adic Herz spaces. Our main goal is to obtain the boundedeness of $ p $-adic intrinsic square function in grand $ p $-adic Herz-Morrey spaces with variable exponent $ {M\dot{K} ^{\alpha, u), \theta}_{ s(\cdot)}(\mathbb{Q}^n_p)} $. The boundedness is proven by exploiting the properties of variable exponents in these function spaces.

    Citation: Babar Sultan, Mehvish Sultan, Aziz Khan, Thabet Abdeljawad. Boundedness of an intrinsic square function on grand $ p $-adic Herz-Morrey spaces[J]. AIMS Mathematics, 2023, 8(11): 26484-26497. doi: 10.3934/math.20231352

    Related Papers:

  • This research paper focuses on establishing a framework for grand Herz-Morrey spaces defined over the $ p $-adic numbers and their associated $ p $-adic intrinsic square function. We will define the ideas of grand $ p $-adic Herz-Morrey spaces with variable exponent $ {M\dot{K} ^{\alpha, u), \theta}_{ s(\cdot)}(\mathbb{Q}^n_p)} $ and $ p $-adic intrinsic square function. Moreover, the corresponding operator norms are estimated. Grand $ p $-adic Herz-Morrey spaces with variable exponent is the generalization of $ p $-adic Herz spaces. Our main goal is to obtain the boundedeness of $ p $-adic intrinsic square function in grand $ p $-adic Herz-Morrey spaces with variable exponent $ {M\dot{K} ^{\alpha, u), \theta}_{ s(\cdot)}(\mathbb{Q}^n_p)} $. The boundedness is proven by exploiting the properties of variable exponents in these function spaces.



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