Self-induced interval exchanges and piecewise linear maps of the interval (2000)
- Authors:
- Autor USP: VIDALON, CARLOS TEOBALDO GUTIERREZ - ICMC
- Unidade: ICMC
- Assunto: TOPOLOGIA
- Language: Inglês
- Imprenta:
- Publisher: ICMC-USP
- Publisher place: São Carlos
- Date published: 2000
- Source:
- ISSN: 0103-2577
-
ABNT
GUTIERREZ VIDALON, Carlos e CORTEZ, Milton Edwin Cobo. Self-induced interval exchanges and piecewise linear maps of the interval. . São Carlos: ICMC-USP. Disponível em: https://repositorio.usp.br/directbitstream/a0d416fd-e72a-41e4-8508-f5ea83daa6ff/1095589.pdf. Acesso em: 13 mar. 2026. , 2000 -
APA
Gutierrez Vidalon, C., & Cortez, M. E. C. (2000). Self-induced interval exchanges and piecewise linear maps of the interval. São Carlos: ICMC-USP. Recuperado de https://repositorio.usp.br/directbitstream/a0d416fd-e72a-41e4-8508-f5ea83daa6ff/1095589.pdf -
NLM
Gutierrez Vidalon C, Cortez MEC. Self-induced interval exchanges and piecewise linear maps of the interval [Internet]. 2000 ;[citado 2026 mar. 13 ] Available from: https://repositorio.usp.br/directbitstream/a0d416fd-e72a-41e4-8508-f5ea83daa6ff/1095589.pdf -
Vancouver
Gutierrez Vidalon C, Cortez MEC. Self-induced interval exchanges and piecewise linear maps of the interval [Internet]. 2000 ;[citado 2026 mar. 13 ] Available from: https://repositorio.usp.br/directbitstream/a0d416fd-e72a-41e4-8508-f5ea83daa6ff/1095589.pdf - Asymptotic stability at infinity for differentiable vector fields of the plane
- A remark on an eigenvalue condition for the global injectivity of differentiable maps of 'R POT. 2'
- Hopf bifurcation at infinity for planar vector fields
- Simple umbilic points on surfaces immersed in 'R POT.4'
- On Peixoto's conjecture for flows on non-orientable 2-manifolds
- Injectivity of differentiable maps 'R pot.2' 'seta' 'R pot.2' at infinity
- Properness and the Jacobian conjecture in 'R POT. 2'
- Dynamic and ergodic properties of interval exchange transformations, an introduction
- On nonsingular polynomial maps of `RPOT.2´
- Planar embeddings with a globally attracting fixed point
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