A new normal form for monodromic nilpotent singularities of planar vector fields
DOI10.1007/s00009-021-01820-7zbMath1482.34106OpenAlexW3178388985MaRDI QIDQ2050119
Cristóbal García, Antonio Algaba, Jaume Giné
Publication date: 30 August 2021
Published in: Mediterranean Journal of Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s00009-021-01820-7
Bogdanov-Takens normal formcenter problem, nilpotent centermonodromic nilpotent singularitiesquasi-homogeneous vector fields
Periodic solutions to ordinary differential equations (34C25) Topological structure of integral curves, singular points, limit cycles of ordinary differential equations (34C05) Transformation and reduction of ordinary differential equations and systems, normal forms (34C20)
Related Items (1)
Uses Software
Cites Work
- Unnamed Item
- Unnamed Item
- Analytic nilpotent centers as limits of nondegenerate centers revisited
- Centers of quasi-homogeneous polynomial planar systems
- Integrability of two dimensional quasi-homogeneous polynomial differential systems
- The center problem. A view from the normal form theory
- Focus-center problem of planar degenerate system
- Reversibility and quasi-homogeneous normal forms of vector fields
- A characterization of centres via first integrals
- Further reduction of the Takens-Bogdanov normal form
- Center problem for several differential equations via Cherkas' method
- Reversibility and classification of nilpotent centers
- The center problem for \(\mathbb{Z}_2\)-symmetric nilpotent vector fields
- Bi-center problem and bifurcation of limit cycles from nilpotent singular points in \(Z_{2}\)-equivariant cubic vector fields
- Nilpotent centers of cubic systems
- Analytic integrability around a nilpotent singularity
- Singularities of vector fields
- Existence of an inverse integrating factor, center problem and integrability of a class of nilpotent systems
- A method for characterizing nilpotent centers
- Integrability of planar nilpotent differential systems through the existence of an inverse integrating factor
- Center conditions for nilpotent cubic systems using the Cherkas method
- Center conditions of a particular polynomial differential system with a nilpotent singularity
- Generating limit cycles from a nilpotent critical point via normal forms
- Nondegenerate and nilpotent centers for a cubic system of differential equations
- The center problem for a family of systems of differential equations having a nilpotent singular point
- The nondegenerate center problem and the inverse integrating factor
- The problem of distinguishing between a center and a focus for nilpotent and degenerate analytic systems
- On orbital-reversibility for a class of planar dynamical systems
- Stability of motion
- Monodromy, center-focus and integrability problems for quasi-homogeneous polynomial systems
- Formal Inverse Integrating Factor and the Nilpotent Center Problem
- Investigation of the behaviour of the integral curves of a system of two differential equations in the neighbourhood of a singular point
- The integrability problem for a class of planar systems
- Local analytic integrability for nilpotent centers
- Nilpotent centres via inverse integrating factors
- ON THE CENTER PROBLEM FOR DEGENERATE SINGULAR POINTS OF PLANAR VECTOR FIELDS
- SUFFICIENT CONDITIONS FOR A CENTER AT A COMPLETELY DEGENERATE CRITICAL POINT
- Symétrie et forme normale des centres et foyers dégénérés
- SINGULAR
- MONODROMY AND STABILITY FOR NILPOTENT CRITICAL POINTS
This page was built for publication: A new normal form for monodromic nilpotent singularities of planar vector fields
