Journal
JOURNAL OF DIFFERENTIAL EQUATIONS
Volume 260, Issue 8, Pages 6697-6715Publisher
ACADEMIC PRESS INC ELSEVIER SCIENCE
DOI: 10.1016/j.jde.2016.01.008
Keywords
Entry-exit function; Geometric singular perturbation theory; Bifurcation delay; Blow-up; Turning point
Categories
Funding
- FWO project [G093910]
- NSF [DMS-1211707]
- Direct For Mathematical & Physical Scien
- Division Of Mathematical Sciences [1211707] Funding Source: National Science Foundation
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For small epsilon > 0, the system (x) over dot = epsilon, (z) over dot = h(x, z, s)z, with h(x, 0, 0) < 0 for x < 0 and h(x, 0, 0) > 0 for x > 0, admits solutions that approach the x-axis while x < 0 and are repelled from it when x > 0. The limiting attraction and repulsion points are given by the well-known entry-exit function. For h(x, z, s)z replaced by h(x, z, epsilon)z(2), we explain this phenomenon using geometric singular perturbation theory. We also show that the linear case can be reduced to the quadratic case, and we discuss the smoothness of the return map to the line z = z(0), z(0) > 0, in the limit epsilon -> 0. (C) 2016 Elsevier Inc. All rights reserved.
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