Oscillation, Bifurcation and Chaos: Proceedings of the 1986 Annual Seminar Held July 13-25, 1986The year 1986 marked the sesquicentennial of the publication in 1836 of J Sturm's memoir on boundary value problems for second order equations. In July 1986, the Canadian Mathematical Society sponsored the International Conference on Oscillation, Bifurcation and Chaos. This volume contains the proceedings of this conference. |
Contents
III | 3 |
IV | 43 |
V | 57 |
VI | 87 |
VII | 117 |
VIII | 125 |
IX | 135 |
X | 143 |
XXX | 343 |
XXXI | 363 |
XXXII | 387 |
XXXIII | 409 |
XXXIV | 433 |
XXXV | 437 |
XXXVI | 455 |
XXXVII | 475 |
XI | 153 |
XII | 161 |
XIII | 177 |
XIV | 189 |
XV | 203 |
XVI | 211 |
XVII | 217 |
XIX | 237 |
XX | 251 |
XXI | 259 |
XXII | 267 |
XXIII | 277 |
XXIV | 289 |
XXVI | 295 |
XXVII | 307 |
XXVIII | 319 |
XXIX | 333 |
XXXVIII | 491 |
XXXIX | 507 |
XL | 517 |
XLI | 535 |
XLII | 551 |
XLIII | 569 |
XLIV | 589 |
XLV | 599 |
XLVI | 611 |
XLVII | 627 |
XLVIII | 645 |
XLIX | 655 |
L | 677 |
LI | 683 |
LII | 693 |
Common terms and phrases
1987 American Mathematical a₁ American Mathematical Society analytic assume asymptotic behavior bifurcating solutions Bifurcation Theory Billigheimer boundary conditions bounded codimension coefficients Conference Proceedings Volume consider continued fraction Corollary corresponding curve defined denote diagrams differential equations dynamics eigenvalues equilibrium exists F₁ finite function given Golubitsky Hamiltonian Hence homoclinic homoclinic orbit Hopf bifurcation implies infinity integral interval invariant Lemma limit cycles linear manifold Math Mathematics Subject Classification matrix Melnikov nonlinear nonoscillatory normal form obtain operator orthogonal orthogonal polynomials oscillation oscillatory parameter periodic orbit periodic solutions perturbation Poincaré map polynomials positive problem quadratic Riccati Riccati equation saddle-node satisfies second order self-adjoint singular point solution of Eq space stability Suppose symmetry t₁ theory torus unstable unstable manifold vector field zero µ³