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A publicação pode ser exportada nos seguintes formatos: referência da APA (American Psychological Association), referência do IEEE (Institute of Electrical and Electronics Engineers), BibTeX e RIS.

Exportar Referência (APA) 
Laureano, R. D. (2020). Livschitz Theorem in suspension flows and Markov systems: approach in cohomology of systems. Symmetry. 12 (3)
Exportar Referência (IEEE) 
M. D. Laureano,  "Livschitz Theorem in suspension flows and Markov systems: approach in cohomology of systems", in Symmetry, vol. 12, no. 3, 2020
Exportar BibTeX 
@article{laureano2020_1775709143543,
	author = "Laureano, R. D.",
	title = "Livschitz Theorem in suspension flows and Markov systems: approach in cohomology of systems",
	journal = "Symmetry",
	year = "2020",
	volume = "12",
	number = "3",
	doi = "10.3390/sym12030338",
	url = "https://www.mdpi.com/2073-8994/12/3/338"
}
Exportar RIS 
TY  - JOUR
TI  - Livschitz Theorem in suspension flows and Markov systems: approach in cohomology of systems
T2  - Symmetry
VL  - 12
IS  - 3
AU  - Laureano, R. D.
PY  - 2020
SN  - 2073-8994
DO  - 10.3390/sym12030338
UR  - https://www.mdpi.com/2073-8994/12/3/338
AB  - It is presented and proved a version of Livschitz Theorem for hyperbolic flows pragmatically oriented to the cohomological context. Previously, it is introduced the concept of cocycle and a natural notion of symmetry for cocycles. It is discussed the fundamental relationship between the existence of solutions of cohomological equations and the behavior of the cocycles along periodic orbits. The generalization of this theorem to a class of suspension flows is also discussed and proved. This generalization allows giving a different proof of the Livschitz Theorem for flows based on the construction of Markov systems for hyperbolic flows.
ER  -