Quadratic vector fields with a weak focus of third order
From MaRDI portal
Publication:1365653
DOI10.5565/PUBLMAT_41197_02zbMath0880.34031MaRDI QIDQ1365653
Publication date: 2 February 1998
Published in: Publicacions Matemàtiques (Search for Journal in Brave)
Full work available at URL: https://eudml.org/doc/41291
Related Items
THE GEOMETRY OF QUADRATIC DIFFERENTIAL SYSTEMS WITH A WEAK FOCUS OF SECOND ORDER ⋮ Test Models for Statistical Inference: Two-Dimensional Reaction Systems Displaying Limit Cycle Bifurcations and Bistability ⋮ Structurally unstable quadratic vector fields of codimension two: families possessing either a cusp point or two finite saddle-nodes ⋮ Phase portraits of separable quadratic systems and a bibliographical survey on quadratic systems ⋮ Lyapunov quantities and limit cycles of two-dimensional dynamical systems. Analytical methods and symbolic computation ⋮ Structurally unstable quadratic vector fields of codimension two: families possessing one finite saddle-node and a separatrix connection ⋮ Visualization of four normal size limit cycles in two-dimensional polynomial quadratic system ⋮ Evolutionary stable strategies and cubic vector fields ⋮ Characterization of the finite weak singularities of quadratic systems via invariant theory ⋮ Phase portraits of planar semi-homogeneous vector fields-I ⋮ Visualization of four limit cycles of two-dimensional quadratic systems in the parameter space ⋮ Geometry of quadratic differential systems in the neighborhood of infinity ⋮ Hidden oscillations in dynamical systems. 16 Hilbert's problem, Aizerman's and Kalman's conjectures, hidden attractors in Chua's circuits ⋮ Phase portraits of the quadratic polynomial Liénard differential systems ⋮ THE GEOMETRY OF QUADRATIC POLYNOMIAL DIFFERENTIAL SYSTEMS WITH A WEAK FOCUS AND AN INVARIANT STRAIGHT LINE ⋮ HIDDEN ATTRACTORS IN DYNAMICAL SYSTEMS. FROM HIDDEN OSCILLATIONS IN HILBERT–KOLMOGOROV, AIZERMAN, AND KALMAN PROBLEMS TO HIDDEN CHAOTIC ATTRACTOR IN CHUA CIRCUITS
