Author(s): Anil Singh and Mudasir Ahmad Lone

Abstract: We develop a unified modular framework for Orlicz-type sequence spaces generated by either a single Orlicz function or a coordinatewise family of Orlicz functions. Under a uniform ∆₂ growth hypothesis we prove that the associated Luxemburg functional induces a complete BK-topology. We then introduce Maddox-type variable-exponent Orlicz spaces ℓ_ψ(p) and show that they inherit the same BK-structure. Finally, we study Orlicz-paranormed matrix domains ℓ_ψ(A) under lower triangular matrices with nonzero diagonal, establishing completeness, inclusion criteria driven by global dominance of Orlicz functions and by weight monotonicity, explicit descriptions of the Kothe-Toeplitz α-, β-, and γ-duals in terms of the conjugate Orlicz function, and concrete Schauder bases transported via A⁻¹.

DOI: 10.22271/maths.2025.v10.i6c.2235

Pages: 251-254 | Views: 39 | Downloads: 2

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