2017
DOI: 10.1007/s13163-017-0226-5
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Distributionally n-chaotic dynamics for linear operators

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Cited by 12 publications
(6 citation statements)
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“…Concerning the last example, we would like to note that Z. Yin and Y. Huang have recently proved in [61] that for any open set U ⊆ (0, ∞) which is bounded away from zero, there exists a bounded linear operator T on l p , where 1 ≤ p < ∞, such that U = {λ > 0 : λT is distributionally chaotic}. Motivated by the results achieved in [61], for any integer i ∈ N 12 , any tuple r = (r 1 , r 2 , • • •, r N ) ∈ N N and any multivalued linear operator A on a Fréchet space X, we introduce the set…”
Section: Let Us Recall That For Any Mlo Extensionmentioning
confidence: 93%
See 1 more Smart Citation
“…Concerning the last example, we would like to note that Z. Yin and Y. Huang have recently proved in [61] that for any open set U ⊆ (0, ∞) which is bounded away from zero, there exists a bounded linear operator T on l p , where 1 ≤ p < ∞, such that U = {λ > 0 : λT is distributionally chaotic}. Motivated by the results achieved in [61], for any integer i ∈ N 12 , any tuple r = (r 1 , r 2 , • • •, r N ) ∈ N N and any multivalued linear operator A on a Fréchet space X, we introduce the set…”
Section: Let Us Recall That For Any Mlo Extensionmentioning
confidence: 93%
“…Describing the structure of set DDC A,i, r is quite non-trivial and requires a series of further analyses. The existence of invariant (d, i)-distributionally scrambled sets and the existence of common (d, i)-distributionally irregular vectors for tuples of multivalued linear operators are delicate problems that will not be discussed here, as well (see [58]- [61] and references quoted therein for further information in this direction).…”
Section: Let Us Recall That For Any Mlo Extensionmentioning
confidence: 99%
“…For operators on Banach spaces, DC1 and DC2 are always equivalent [13,Theorem 2], and imply Li-Yorke chaos. Li-Yorke chaos and distributional chaos for linear operators have been studied in [6,8,10,11,12,13,14,27,28,32,33,38,40,41,42], for instance.…”
Section: Notations and Preliminariesmentioning
confidence: 99%
“…This is partly because the rigorous proof of the existence of their chaotic behaviors is challenging. For more results on the chaos in infinite-dimensional dynamical systems, we refer to [7,15,21,22,23,24] and the references therein.…”
mentioning
confidence: 99%
“…Then by Theorem 2.10, the solutions w x (x, t) and w t (x, t) of system (23) have chaotic oscillations. Taking the parameter pairs (α 1 , β 1 ) = (0.1, 1) and (α 2 , β 2 ) = (0.8, 1), which satisfy (24), the spatiotemporal profiles of w x (x, t) and w t (x, t) of system (23) are shown in Figure 1. It is easy to see that w x (x, t) and w t (x, t) are rapidly oscillatory as t increases.…”
mentioning
confidence: 99%