New lower bounds for the Hilbert numbers using reversible centers
DOI10.1088/1361-6544/aae94dzbMath1414.34024OpenAlexW2906506220WikidataQ128728250 ScholiaQ128728250MaRDI QIDQ4644689
Rafel Prohens, Joan Torregrosa
Publication date: 8 January 2019
Published in: Nonlinearity (Search for Journal in Brave)
Full work available at URL: http://ddd.uab.cat/record/204392
Topological structure of integral curves, singular points, limit cycles of ordinary differential equations (34C05) Bifurcation theory for ordinary differential equations (34C23) Theory of limit cycles of polynomial and analytic vector fields (existence, uniqueness, bounds, Hilbert's 16th problem and ramifications) for ordinary differential equations (34C07)
Related Items
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Higher order limit cycle bifurcations from non-degenerate centers
- Parallelization of the Lyapunov constants and cyclicity for centers of planar polynomial vector fields
- New results on the study of \(Z_q\)-equivariant planar polynomial vector fields
- Lower bounds for the Hilbert number of polynomial systems
- Bifurcation of limit cycles from quadratic isochrones
- On a Żołądek theorem
- On the number of limit cycles of a \(\mathbb{Z}_4\)-equivariant quintic near-Hamiltonian system
- Existence of 121 limit cycles in a perturbed planar polynomial Hamiltonian vector field of degree 11
- Bifurcations of limit cycles in a \(Z_{4}\)-equivariant quintic planar vector field
- A cubic system with thirteen limit cycles
- A method of constructing cycles without contact around a weak focus
- Remarks on ``The classification of reversible cubic systems with center
- Bifurcation of planar vector fields and Hilbert's sixteenth problem
- Center conditions: Rigidity of logarithmic differential equations.
- Singularities of vector fields
- Bifurcation of limit cycles in a quintic Hamiltonian system under a sixth-order perturbation
- Qualitative theory of planar differential systems
- ON THE NUMBER AND DISTRIBUTIONS OF LIMIT CYCLES IN A QUINTIC PLANAR VECTOR FIELD
- AN IMPROVED LOWER BOUND ON THE NUMBER OF LIMIT CYCLES BIFURCATING FROM A HAMILTONIAN PLANAR VECTOR FIELD OF DEGREE 7
- Eleven small limit cycles in a cubic vector field
- Polynomial systems: a lower bound for the Hilbert numbers
- A Quartic System with Twenty-Six Limit Cycles
- The CD45 Case Revisited
- AN IMPROVED LOWER BOUND ON THE NUMBER OF LIMIT CYCLES BIFURCATING FROM A QUINTIC HAMILTONIAN PLANAR VECTOR FIELD UNDER QUINTIC PERTURBATION
- On hereditarily indecomposable Banach spaces
This page was built for publication: New lower bounds for the Hilbert numbers using reversible centers
