Computation of almost invariant sets for perturbed systems

2002 ◽  
Author(s):  
F. Colonius ◽  
W. Kliemann
Keyword(s):  
Invariant Sets ◽  
Perturbed Systems ◽  
Almost Invariant Sets

scholarly journals Note on asymptotic equivalence for measure differential equations Corrigendum

1978 ◽  
Vol 19 (2) ◽  
pp. 319-319
Author(s):  
V. Sree Hari Rao
Keyword(s):  
Differential Equations ◽  
Invariant Sets ◽  
Asymptotic Equivalence ◽  
Nonlinear Anal ◽  
Perturbed Systems

The last 3 references in the author's note [1] should read as follows:[4] V. Sree Hari Rao, “On boundedness of impulsively perturbed systems”, Bull. Austral. Math. Soc. 18 (1978), 237–242.[5] V. Sree Hari Rao, “Asymptotically self invariant sets and stability of measure differential equations“, Nonlinear Anal., Theory, Methods Appl. 2 (1978), 483–489.[6] V. Sree Hari Rao, ”Note on conditionally asymptotically invariant sets“, J. Mathematical and Physical Sci. 12 (1978), 469–471.

scholarly journals Instability of the isolated spectrum for W-shaped maps

2012 ◽  
Vol 33 (4) ◽  
pp. 1052-1059
Author(s):  
ZHENYANG LI ◽  
PAWEŁ GÓRA
Keyword(s):  
The Other ◽  
Invariant Sets ◽  
Second Eigenvalue ◽  
Almost Invariant Sets

AbstractIn this note we consider the W-shaped map $W_0=W_{s_1,s_2}$ with ${1}/{s_1}+{1}/{s_2}=1$ and show that the eigenvalue $1$ is not stable. We do this in a constructive way. For each perturbing map $W_a$ we show the existence of a ‘second’ eigenvalue $\lambda _a$, such that $\lambda _a\to 1$ as $a\to 0$, which proves instability of the isolated spectrum of $W_0$. At the same time, the existence of second eigenvalues close to 1 causes the maps $W_a$to behave in a metastable way. There are two almost-invariant sets, and the system spends long periods of consecutive iterations in each of them, with infrequent jumps from one to the other.

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