Results 11 to 20 of about 3,423 (281)
Orbit growth for algebraic flip systems [PDF]
Ergodic Theory and Dynamical Systems, 2014 An algebraic flip system is an action of the infinite dihedral group by automorphisms of a compact abelian group $X$. In this paper, a fundamental structure theorem is established for irreducible algebraic flip systems, that is, systems for which the only closed invariant subgroups of $X$ are finite.
Miles, Richard, Richard Miles
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Attractors and orbit-flip homoclinic orbits for star flows [PDF]
Proceedings of the American Mathematical Society, 2013 9 pages, 2 ...
C. A. Morales
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Resonant Homoclinic Flips Bifurcation in Principal Eigendirections
Abstract and Applied Analysis, 2013 A codimension-4 homoclinic bifurcation with one orbit flip and one inclination flip at principal eigenvalue direction resonance is considered. By introducing a local active coordinate system in some small neighborhood of homoclinic orbit, we get the ...
Tiansi Zhang, Xiaoxin Huang, Deming Zhu
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Bifurcations of Orbit and Inclination Flips Heteroclinic Loop with Nonhyperbolic Equilibria [PDF]
The Scientific World Journal, 2014 The bifurcations of heteroclinic loop with one nonhyperbolic equilibrium and one hyperbolic saddle are considered, where the nonhyperbolic equilibrium is supposed to undergo a transcritical bifurcation; moreover, the heteroclinic loop has an orbit flip ...
Fengjie Geng, Junfang Zhao
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Strange attractor in the unfolding of an inclination-flip homoclinic orbit
Ergodic Theory and Dynamical Systems, 1996 AbstractWe study the unfolding of a smooth vector-fieldXon ℝ3having a homoclinic orbit to a hyperbolic equilibrium point with three real eigenvalues satisfying − λss< λs< 0 < λuWe say that Γ is an inclination-flip homoclinic orbit if the extended unstable manifold at the equilibrium point is, along Γ, non-transverse to the stable manifold and ...
Vincent Naudot
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The cusp horseshoe and its bifurcations in the unfolding of an inclination-flip homoclinic orbit
Ergodic Theory and Dynamical Systems, 1994 AbstractDeng has demonstrated a mechanism through which a perturbation of a vector field having an inclination-flip homoclinic orbit would have a Smale horseshoe. In this article we prove that if the eigenvalues of the saddle to which the homoclinic orbit is asymptotic satisfy the condition 2λu > min{−λs, λuu} then there are arbitrarily small ...
HOMBURG, AJ, KOKUBU, H, KRUPA, M
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Spin-Orbit Matrix Elements for a Combined Spin-Flip and IP/EA Approach
Journal of Chemical Theory and Computation, 2020 We present a practical approach for computing the Breit-Pauli spin-orbit matrix elements of multiconfigurational systems with both spin and spatial degeneracies based on our recently developed RAS-nSF-IP/EA method (Houck, S. E.; et al. J. Chem. Theory Comput. 2019, 15, 2278). The spin-orbit matrix elements over all the multiplet components are computed
Oinam Romesh Meitei +2 more
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Inclination-flip homoclinic orbits arising from orbit-flip
Nonlinearity, 2001 zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Morales, C. A., Pacifico, M. J.
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Accurate Spin–Orbit Coupling by Relativistic Mixed-Reference Spin-Flip-TDDFT
, 2023 Relativistic mixed-reference spin-flip (MRSF)-TDDFT is developed considering the spin–orbit coupling (SOC) within the mean-field approximation. The resulting SOC-MRSF faithfully reproduces the experiments with very high accuracy, which is also consistent
Seunghoon Lee (201604) +9 more
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A Proof of the Orbit Conjecture for Flipping Edge-Labelled Triangulations [PDF]
Discrete & Computational Geometry, 2018 19 pages, 2 ...
Anna Lubiw +2 more
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