La Classification Mathématique par matières 2000
Mathematics subject Classification 2000
Question : CC = Orbit
22-XX Topological groups, Lie groups [For transformation groups, see 54H15, 57Sxx, 58-XX. For abstract harmonic analysis, see 43-XX]
- 22E27 Representations of nilpotent and solvable Lie groups (special orbital integrals, non-type I representations, etc.)
37-XX Dynamical systems and ergodic theory [See also 26A18, 28Dxx, 34Cxx, 34Dxx, 35Bxx, 46Lxx, 58Jxx, 70-XX]
- 37A20 Orbit equivalence, cocycles, ergodic equivalence relations
[Nouveau code MSC 2000]
- 37C27 Periodic orbits of vector fields and flows
[Nouveau code MSC 2000]
- Codes MSC1991 affiliés :
34C25, 58F22
- 37C29 Homoclinic and heteroclinic orbits
[Nouveau code MSC 2000]
- Codes MSC1991 affiliés :
34C23, 34C37, 58F14, 58F99
- 37C35 Orbit growth
[Nouveau code MSC 2000]
- Code MSC1991 affilié :
58F99
- 37D05 Hyperbolic orbits and sets
[Nouveau code MSC 2000]
- Codes MSC1991 affiliés :
58F09, 58F15
- 37E15 Combinatorial dynamics (types of periodic orbits)
[Nouveau code MSC 2000]
- Code MSC1991 affilié :
58F99
- 37G15 Bifurcations of limit cycles and periodic orbits
[Nouveau code MSC 2000]
- 37J45 Periodic, homoclinic and heteroclinic orbits; variational methods, degree-theoretic methods
[Nouveau code MSC 2000]
- Codes MSC1991 affiliés :
34C25, 34C37, 58F05, 58F14, 58F22
- 37J50 Action-minimizing orbits and measures
[Nouveau code MSC 2000]
- Codes MSC1991 affiliés :
58E99, 58F05, 58F99
70-XX Mechanics of particles and systems [For relativistic mechanics, see 83A05 and 83C10; for statistical mechanics, see 82-XX]
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