2016
DOI: 10.1515/msds-2016-0003
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Periodicity, almost periodicity for time scales and related functions

Abstract: Abstract:In this paper, we study almost periodic and changing-periodic time scales considered by Wang and Agarwal in 2015. Some improvements of almost periodic time scales are made. Furthermore, we introduce a new concept of periodic time scales in which the invariance for a time scale is dependent on an translation direction. Also some new results on periodic and changing-periodic time scales are presented.

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Cited by 30 publications
(51 citation statements)
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“…Since Π * * is relatively dense in Π in Definition 2.9, one can observe that the graininess function µ is bounded. From [33], we can see that ACCTS is the most general type of independent variables with almost periodicity.…”
Section: Introductionmentioning
confidence: 93%
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“…Since Π * * is relatively dense in Π in Definition 2.9, one can observe that the graininess function µ is bounded. From [33], we can see that ACCTS is the most general type of independent variables with almost periodicity.…”
Section: Introductionmentioning
confidence: 93%
“…The theory of dynamic equations on time scales also extends to cases "in between", e.g., to the so-called q-difference equations (T = q N 0 := {q t : t ∈ N 0 for q > 1}) or (T = q Z := q Z ∪ {0}), and can be applied on different types of time scales such as T = hN, T = N 2 , and T = T n the space of the harmonic numbers. Several authors have expounded on various aspects of this new theory (see [1,2,4,7,18,33]). …”
Section: Introductionmentioning
confidence: 99%
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