Bifurcation theory : an introduction with applications to PDEs

Introduction Appendix I Local Theory I.1 The Implicit Function Theorem I.2 The Method of Lyapunov-Schmidt I.3 The Lyapunov-Schmidt Reduction for Potential Operators I.4 An Implicit Function Theorem for One-Dimensional Kernels: Turning Points I.5 Bifurcation with a One-Dimensional Kernel I.6 Bifurcation Formulas (stationary case) I.7 The Principle of Exchange of Stability (stationary case) I.8 Hopf Bifurcation I.9 Bifurcation Formulas for Hopf Bifurcation I.10 A Lyapunov Center Theorem I.11 Constrained Hopf Bifurcation for Hamiltonian, Reversible, and Conservative Systems I.12 The Principle of Exchange of Stability for Hopf Bifurcation I.13 Continuation of Periodic Solutions and Their Stability I.14 Period Doubling Bifurcation and Exchange of Stability I.15 Newton Polygon I.16 Degenerate Bifurcation at a Simple Eigenvalue and Stability of Bifurcating Solutions I.17 Degenerate Hopf Bifurcation and Floquet Exponents of Bifurcating Periodic Orbits I.18 The Principle of Reduced Stability for Stationary and Periodic Solutions I.19 Bifurcation with High-Dimensional Kernels, Multiparameter Bifurcation and Application of the Principle of Reduced Stability I.20 Bifurcation from Infinity I.21 Bifurcation with High-Dimensional Kernels for Potential Operators: Variational Methods I.22 Notes and Remarks to Chapter I Appendix II Global Theory II.1 The Brouwer Degree II.2 The Leray Schauder Degree II.3 Application of the Degree in Bifurcation Theory II.4 Odd Crossing Numbers II.5 A Degree for a Class of Proper Fredholm Operators and Global Bifurcation Theorems II.6 A Global Implicit Function Theorem II.7 Change of Morse Index and Local Bifurcation for Potential Operators II.8 Notes and Remarks to Chapter II Appendix III Applications III.1 The Fredholm Property of Elliptic Operators III.2 Local Bifurcation for Elliptic Problems III.3 Free Nonlinear Vibrations III.4 Hopf Bifurcation for Parabolic Problems III.5 Global Bifurcation and Continuation for Elliptic Problems III.6 Preservation of Nodal Structure on Global Branches III.7 Smoothness and Uniqueness of Global Positive Solution Branches III.8 Notes and Remarks to Chapter III

[1]  T. Healey,et al.  Free nonlinear vibrations for plate equations on the equilateral triangle , 2001 .

[2]  W. Strauss,et al.  Exact periodic traveling water waves with vorticity , 2002 .

[3]  Minimizing Sequences Selected via Singular Perturbations, and their Pattern Formation , 2000 .

[4]  J. Schwartz,et al.  Linear Operators. Part I: General Theory. , 1960 .

[5]  H. Kielhöfer Smoothness and asymptotics of global positive branches of Δu+λf(u)=0 , 1992 .

[6]  O. Ladyženskaja Linear and Quasilinear Equations of Parabolic Type , 1968 .

[7]  Daniel B. Henry Geometric Theory of Semilinear Parabolic Equations , 1989 .

[8]  A. Marino La biforcazione nel caso variazionale , 1973 .

[9]  K. Kirchgässner,et al.  Generalized Hopf bifurcation in Hilbert space , 1979 .

[10]  Hansj rg Kielh fer Interaction of Periodic and Stationary Bifurcation from Multiple Eigenvalues , 2005 .

[11]  H. Kielhöfer,et al.  Uniqueness of global positive solution branches of nonlinear elliptic problems , 1994 .

[12]  S. Antman Nonlinear problems of elasticity , 1994 .

[13]  H. Kielhöfer Multiple eigenvalue bifurcation for Fredholm operators. , 1985 .

[14]  J. Ize Obstruction theory and multiparameter Hopf bifurcation , 1985 .

[15]  Global topological perturbations of nonlinear elliptic eigenvalue problems , 1983 .

[16]  T. Healey Global Bifurcations and Continuation in the Presence of Symmetry with an Application to Solid Mechanics , 1988 .

[17]  Tosio Kato Perturbation theory for linear operators , 1966 .

[18]  P. Rabier,et al.  Orientability of Fredholm families and topological degree for orientable nonlinear Fredholm mappings , 1994 .

[19]  Hansjörg Kielhöfer,et al.  On the Lyapunov-stability of stationary solutions of semilinear parabolic differential equations , 1976 .

[20]  Bifurcation at eigenvalues of odd multiplicity , 1973 .

[21]  H. Kielhöfer Bifurcation of periodic solutions for a semilinear wave equation , 1979 .

[22]  T. Healey,et al.  Symmetry and nodal properties in the global bifurcation analysis of quasi-linear elliptic equations , 1991 .

[23]  G. H. Pimbley On eigenfunction branches of nonlinear operators, and their bifurcations , 1969 .

[24]  André Vanderbauwhede,et al.  Local bifurcation and symmetry , 1982 .

[25]  Julián López-Gómez,et al.  Optimal multiplicity in local bifurcation theory I. Generalized generic eigenvalues , 1988 .

[26]  H. Kielhöfer A bifurcation theorem for potential operators , 1988 .

[27]  M. Crandall,et al.  Bifurcation from simple eigenvalues , 1971 .

[28]  P. Fitzpatrick,et al.  Parity and generalized multiplicity , 1991 .

[29]  A. Tromba Degree theory on Banach manifolds , 1968 .

[30]  J. Hale,et al.  Ordinary Differential Equations , 2019, Fundamentals of Numerical Mathematics for Physicists and Engineers.

[31]  A. Friedman Partial Differential Equations of Parabolic Type , 1983 .

[32]  P. Chossat,et al.  Methods in Equivariant Bifurcations and Dynamical Systems , 2000 .

[33]  G. Iooss,et al.  Elementary stability and bifurcation theory , 1980 .

[34]  Hansjörg Kielhöfer,et al.  Stability and semilinear evolution equations in Hilbert space , 1974 .

[35]  Paul H. Rabinowitz,et al.  Some global results for nonlinear eigenvalue problems , 1971 .

[36]  J. Mawhin Topological degree methods in nonlinear boundary value problems , 1979 .

[37]  Michael G. Crandall,et al.  Bifurcation, perturbation of simple eigenvalues, itand linearized stability , 1973 .

[38]  P. Rabinowitz Time periodic solutions of nonlinear wave equations , 1971 .

[39]  Peter Hess,et al.  On some linear and nonlinear eigenvalue problems with an indefinite weight function , 1980 .

[40]  J. Ize Bifurcation theory for Fredholm operators , 1976 .

[41]  R. Magnus A Generalization of Multiplicity and the Problem of Bifurcation , 1976 .

[42]  P. Rabinowitz On bifurcation from infinity , 1973 .

[43]  Nonlinear Standing and Rotating Waves on the Sphere , 2000 .

[44]  J. Alexander,et al.  GLOBAL BIFURCATIONS OF PERIODIC ORBITS. , 1978 .

[45]  R. Seydel From Equilibrium to Chaos: Practical Bifurcation and Stability Analysis , 1988 .

[46]  J. Hale,et al.  Dynamics and Bifurcations , 1991 .

[47]  H. Kielhöfer Pattern formation of the stationary Cahn-Hilliard model , 1997, Proceedings of the Royal Society of Edinburgh: Section A Mathematics.

[48]  R. Lauterbach,et al.  On the Principle of Reduced Stability , 1983 .

[49]  H. Kielhöfer Interaction of periodic and stationary bifurcation from multiple eigenvalues , 1986 .

[50]  Bernold Fiedler,et al.  An index for global Hopf bifurcation in parabolic systems. , 1985 .

[51]  E. N. Dancer Boundary‐Value Problems for Ordinary Differential Equations on Infinite Intervals , 1975 .

[52]  D. Schmidt Hopf’s Bifurcation Theorem and the Center Theorem of Liapunov , 1976 .

[53]  T. Ouyang,et al.  EXACT MULTIPLICITY OF POSITIVE SOLUTIONS FOR A CLASS OF SEMILINEAR PROBLEMS , 1998 .

[54]  T. Healey,et al.  A Simple Approach to the 1:1 Resonance Bifurcation in Follower-Load Problems , 2003 .

[55]  Jean Mawhin,et al.  Equivalence theorems for nonlinear operator equations and coincidence degree theory for some mappings in locally convex topological vector spaces , 1972 .

[56]  J. Mawhin,et al.  Multiplicity, Leray-Schauder formula, and bifurcation , 1977 .

[57]  R. Courant,et al.  Methods of Mathematical Physics , 1962 .

[58]  J. López-Gómez Multiparameter local bifurcation based on the linear part , 1989 .

[59]  H. Amann,et al.  On the uniqueness of the topological degree , 1973 .

[60]  K. Deimling Nonlinear functional analysis , 1985 .

[61]  T. Healey,et al.  Positivity of global branches of fully nonlinear elliptic boundary value problems , 1992 .

[62]  T. Healey,et al.  Hidden Symmetry of Fully Nonlinear Boundary Conditions in Elliptic Equations: Global Bifurcation and Nodal Structure , 1992 .

[63]  J. Hale Theory of Functional Differential Equations , 1977 .

[64]  J. Smoller,et al.  Existence, uniqueness, and nondegeneracy of positive solutions of semilinear elliptic equations , 1984 .

[65]  Hausdorff Conullity of Critical Images of Fredholm Maps , 1972 .

[66]  M. A. Krasnoselʹskii Topological methods in the theory of nonlinear integral equations , 1968 .

[67]  T. Healey,et al.  Separation of global solution branches of elliptic systems with symmetry via nodal properties , 1993 .

[68]  H. Simpson,et al.  Global Continuation in Nonlinear Elasticity , 1998 .

[69]  H. Amann Ordinary Differential Equations , 1990 .

[70]  J. Mawhin NONLINEAR FUNCTIONAL ANALYSIS AND PERIODIC SOLUTIONS OF SEMILINEAR WAVE EQUATIONS , 1982 .

[71]  P. Fife,et al.  Perturbation of doubly periodic solution branches with applications to the Cahn-Hilliard equation , 1997 .

[72]  Amnon Pazy,et al.  Semigroups of Linear Operators and Applications to Partial Differential Equations , 1992, Applied Mathematical Sciences.

[73]  Walter Craig,et al.  Newton's method and periodic solutions of nonlinear wave equations , 1993 .

[74]  Hansjörg Kielhöfer,et al.  GenericS1-equivariant vector fields , 1994 .

[75]  H. Kielhöfer Degenerate bifurcation at simple eigenvalues and stability of bifurcating solutions , 1980 .

[76]  H. Kielhöfer Critical points of nonconvex and noncoercive functionals , 2003 .

[77]  Hopf bifurcation for equivariant conservative and time-reversible systems , 1990 .

[78]  M. Golubitsky,et al.  Singularities and Groups in Bifurcation Theory: Volume I , 1984 .

[79]  Michel Demazure,et al.  Bifurcations and Catastrophes: Geometry Of Solutions To Nonlinear Problems , 2000 .

[80]  Pascal Chossat,et al.  The Couette-Taylor Problem , 1992 .

[81]  D. Gilbarg,et al.  Elliptic Partial Differential Equa-tions of Second Order , 1977 .

[82]  R. Schaaf Global Solution Branches of Two Point Boundary Value Problems , 1991 .

[83]  H. Amann Fixed Point Equations and Nonlinear Eigenvalue Problems in Ordered Banach Spaces , 1976 .

[84]  Shui-Nee Chow,et al.  Global Hopf bifurcation from a multiple eigenvalue , 1978 .

[85]  Herbert Amann,et al.  Linear and Quasilinear Parabolic Problems , 2019, Monographs in Mathematics.

[86]  C. Conley Isolated Invariant Sets and the Morse Index , 1978 .

[87]  H. Kielhöfer Floquet exponents of bifurcating periodic orbits , 1982 .

[88]  J. Esquinas Optimal multiplicity in local bifurcation theory II. General case , 1988 .

[89]  Hansjörg Kielhöfer Halbgruppen und semilineare Anfangs-Randwertprobleme , 1974 .

[90]  S. Agmon On the eigenfunctions and on the eigenvalues of general elliptic boundary value problems , 1962 .

[91]  Smoothness of global positive branches of nonlinear elliptic problems over symmetric domains , 1992 .

[92]  H. Kielhöfer Hopf bifurcation from a differentiable viewpoint , 1992 .

[93]  James A. Yorke,et al.  Snakes: Oriented families of periodic orbits, their sources, sinks, and continuation , 1982 .

[94]  Jerrold E. Marsden,et al.  The constrained Liapunov-Schmidt procedure and periodic orbits , 1995 .

[95]  J. Hale,et al.  Methods of Bifurcation Theory , 1996 .

[96]  S. Chow,et al.  A bifurcation theorem for critical points of variational problems , 1988 .

[97]  P. Rabinowitz A bifurcation theorem for potential operators , 1977 .

[98]  J. M. Ball,et al.  GEOMETRIC THEORY OF SEMILINEAR PARABOLIC EQUATIONS (Lecture Notes in Mathematics, 840) , 1982 .

[99]  P. Lions On the Existence of Positive Solutions of Semilinear Elliptic Equations , 1982 .

[100]  D. Sattinger Topics in stability and bifurcation theory , 1973 .

[101]  H. Kielhöfer Hopf bifurcation at multiple eigenvalues , 1979 .

[102]  Eugene L. Allgower,et al.  Numerical continuation methods - an introduction , 1990, Springer series in computational mathematics.

[103]  I. Massabó,et al.  Degree theory for equivariant maps. I , 1989 .

[104]  S. Smale,et al.  An Infinite Dimensional Version of Sard's Theorem , 1965 .

[105]  E. N. Dancer On the Number of Positive Solutions of Weakly Non‐Linear Elliptic Equations when a Parameter is Large , 1986 .

[106]  B. Gidas,et al.  Symmetry and related properties via the maximum principle , 1979 .

[107]  J. Dieudonne Foundations of Modern Analysis , 1969 .

[108]  A. Ambrosetti Branching points for a class of variational operators , 1998 .

[109]  P. Holmes,et al.  Nonlinear Oscillations, Dynamical Systems, and Bifurcations of Vector Fields , 1983, Applied Mathematical Sciences.

[110]  Michael G. Crandall,et al.  The Hopf Bifurcation Theorem in infinite dimensions , 1977 .

[111]  Herbert Amann,et al.  Linear and Quasilinear Parabolic Problems: Volume I: Abstract Linear Theory , 1995 .

[112]  Generalized Jordan chains and two bifurcation theorems of Krasnoselskii , 1989 .

[113]  R. Gaines,et al.  Coincidence Degree and Nonlinear Differential Equations , 1977 .

[114]  M. Furi,et al.  A simple notion of orientability for fredholm maps of index zero between banach manifolds and degree theory , 1998 .

[115]  A. Ambrosetti,et al.  A primer of nonlinear analysis , 1993 .

[116]  Avner Friedman,et al.  Partial differential equations , 1969 .

[117]  O. A. Ladyzhenskai︠a︡,et al.  Linear and quasilinear elliptic equations , 1968 .

[118]  E. N. Dancer The effect of domain shape on the number of positive solutions of certain nonlinear equations, II , 1990 .

[119]  H. Kielhöfer A BUNCH OF STATIONARY OR PERIODIC SOLUTIONS NEAR AN EQUILIBRIUM BY A SLOW EXCHANGE OF STABILITY , 1981 .