Generalized $c$-almost periodic type functions in ${\mathbb{R}}^{n}$

Kostić, Marko

doi:10.5817/am2021-4-221

Cited by 7 publications

(9 citation statements)

References 15 publications

(36 reference statements)

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“…In what follows, we investigate the relationship between the notions of semi-(φ, c j , F, B, P) j∈Nn -periodicity and the semi-(φ, c j , F, B, P) j∈Nn -periodicity of type 1 (2); cf. also [19,Theorem 2.10]: Proposition 2.12. Suppose that condition (C3) holds, φ(0) = 0 and there exists a finite real constant c > 0 such that φ(x + y) ≤ c[φ(x) + φ(y)] for all x, y ≥ 0.…”

Section: Wherementioning

confidence: 98%

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Metrical approximations of functions

Chaouchi¹,

Kostic²,

Velinov³

2022

Preprint

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In this paper, we analyze metrical approximations of functions F : Λ × X → Y by trigonometric polynomials and ρ-periodic type functions, where ∅ = Λ ⊆ R n , X and Y are complex Banach spaces, and ρ is a general binary relation on Y . Besides the classical concept, we analyze Stepanov, Weyl, Besicovitch and Doss generalized approaches to metrical approximations. We clarify many structural properties of introduced spaces of functions and provide several applications of our theoretical results to the abstract Volterra integrodifferential equations and the partial differential equations.2010 Mathematics Subject Classification. 42A75, 43A60, 47D99. Key words and phrases. Metrical approximations of functions by trigonometric polynomials, metrical approximations of functions by ρ-periodic type functions, abstract Volterra integrodifferential equations.

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Section: Wherementioning

confidence: 98%

“…cf. also [19,Example 2.11] for the multi-dimensional analogue of this example. Now we will prove that f (•) is p-semi-anti-periodic function in variation (1 ≤ p < +∞), i.e., semi-(x, −I, 1, P)-periodic with P being the subspace…”

Section: Metrical Approximations: the Main Conceptmentioning

confidence: 99%

Metrical approximations of functions

Chaouchi¹,

Kostic²,

Velinov³

2022

Preprint

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“…The class of multi-dimensional ρ-almost periodic type functions, extending the class of multi-dimensional c-almost periodic type functions when ρ = cI, have recently been investigated by M. Fečkan et al [27]; see also [43]- [44]. The class of Besicovitch-(p, c)-almost periodic functions, where 1 ≤ p < ∞ and c = 1, has not been analyzed in the existing literature so far, even in the one-dimensional setting.…”

Section: Conclusion and Final Remarksmentioning

confidence: 99%

Multi-dimensional Besicovitch almost periodic type functions and applications

Kostić¹

2022

Preprint

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In this paper, we analyze multi-dimensional Besicovitch almost periodic type functions. We clarify the main structural properties for the introduced classes of Besicovitch almost periodic type functions, explore the notion of Besicovitch-Doss almost periodicity in the multi-dimensional setting, and provide some applications of our results to the abstract Volterra integrodifferential equations and the partial differential equations.

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“…The multi-dimensional ρ-almost periodic type functions, the Stepanov multidimensional ρ-almost periodic type functions and the Weyl multi-dimensional ρalmost periodic type functions have recently been examined in [6], [12] and [13].…”

Section: Introductionmentioning

confidence: 99%