Concerning the Hilbert 16th Problem
Author: S. Yakovenko
Publisher: American Mathematical Soc.
Published: 1995
Total Pages: 244
ISBN-13: 9780821803622
DOWNLOAD EBOOK →Lanterna Rally
eBook PDF Download Digital Library
Concerning the Hilbert 16th Problem
Author: I︠U︡. S. Ilʹi︠a︡shenko
Publisher:
Published: 1995
Total Pages:
ISBN-13: 9781470433765
DOWNLOAD EBOOK →This book examines qualitative properties of vector fields in the plane, in the spirit of Hilbert's Sixteenth Problem. Two principal topics explored are bifurcations of limit cycles of planar vector fields and desingularization of singular points for individual vector fields and for analytic families of such fields. In addition to presenting important new developments in this area, this book contains an introductory paper which outlines the general context and describes connections between the papers in the volume. The book will appeal to researchers and graduate students working in the qualit.
Nine Papers on Hilbert's 16th Problem
Author: Dmitri_ Andreevich Gudkov G. A. Utkin
Publisher: American Mathematical Soc.
Published: 1978-12-31
Total Pages: 182
ISBN-13: 9780821895504
DOWNLOAD EBOOK →Translations of articles on mathematics appearing in various Russian mathematical serials.
The Stokes Phenomenon And Hilbert's 16th Problem
Author: B L J Braaksma
Publisher: World Scientific
Published: 1996-05-06
Total Pages: 342
ISBN-13: 9814548081
DOWNLOAD EBOOK →The 16th Problem of Hilbert is one of the most famous remaining unsolved problems of mathematics. It concerns whether a polynomial vector field on the plane has a finite number of limit cycles. There is a strong connection with divergent solutions of differential equations, where a central role is played by the Stokes Phenomenon, the change in asymptotic behaviour of the solutions in different sectors of the complex plane.The contributions to these proceedings survey both of these themes, including historical and modern theoretical points of view. Topics covered include the Riemann-Hilbert problem, Painleve equations, nonlinear Stokes phenomena, and the inverse Galois problem.
Global Bifurcation Theory and Hilbert's Sixteenth Problem
Author: Valery Gaiko
Publisher:
Published: 2014-09-01
Total Pages: 208
ISBN-13: 9781441991690
DOWNLOAD EBOOK →Global Bifurcation Theory and Hilbert’s Sixteenth Problem
Author: V. Gaiko
Publisher: Springer Science & Business Media
Published: 2013-11-27
Total Pages: 199
ISBN-13: 1441991689
DOWNLOAD EBOOK →On the 8th of August 1900 outstanding German mathematician David Hilbert delivered a talk "Mathematical problems" at the Second Interna tional Congress of Mathematicians in Paris. The talk covered practically all directions of mathematical thought of that time and contained a list of 23 problems which determined the further development of mathema tics in many respects (1, 119]. Hilbert's Sixteenth Problem (the second part) was stated as follows: Problem. To find the maximum number and to determine the relative position of limit cycles of the equation dy Qn(X, y) -= dx Pn(x, y)' where Pn and Qn are polynomials of real variables x, y with real coeffi cients and not greater than n degree. The study of limit cycles is an interesting and very difficult problem of the qualitative theory of differential equations. This theory was origi nated at the end of the nineteenth century in the works of two geniuses of the world science: of the Russian mathematician A. M. Lyapunov and of the French mathematician Henri Poincare. A. M. Lyapunov set forth and solved completely in the very wide class of cases a special problem of the qualitative theory: the problem of motion stability (154]. In turn, H. Poincare stated a general problem of the qualitative analysis which was formulated as follows: not integrating the differential equation and using only the properties of its right-hand sides, to give as more as possi ble complete information on the qualitative behaviour of integral curves defined by this equation (176].
Bifurcations of Planar Vector Fields and Hilbert's Sixteenth Problem
Author: Robert Roussarie
Publisher: Springer Science & Business Media
Published: 2013-11-26
Total Pages: 215
ISBN-13: 303480718X
DOWNLOAD EBOOK →In a coherent, exhaustive and progressive way, this book presents the tools for studying local bifurcations of limit cycles in families of planar vector fields. A systematic introduction is given to such methods as division of an analytic family of functions in its ideal of coefficients, and asymptotic expansion of non-differentiable return maps and desingularisation. The exposition moves from classical analytic geometric methods applied to regular limit periodic sets to more recent tools for singular limit sets. The methods can be applied to theoretical problems such as Hilbert's 16th problem, but also for the purpose of establishing bifurcation diagrams of specific families as well as explicit computations. - - - The book as a whole is a well-balanced exposition that can be recommended to all those who want to gain a thorough understanding and proficiency in the recently developed methods. The book, reflecting the current state of the art, can also be used for teaching special courses. (Mathematical Reviews)
On Finiteness in Differential Equations and Diophantine Geometry
Author: Dana Schlomiuk
Publisher: American Mathematical Soc.
Published:
Total Pages: 200
ISBN-13: 9780821869857
DOWNLOAD EBOOK →This book focuses on finiteness conjectures and results in ordinary differential equations (ODEs) and Diophantine geometry. During the past twenty-five years, much progress has been achieved on finiteness conjectures, which are the offspring of the second part of Hilbert's 16th problem. Even in its simplest case, this is one of the very few problems on Hilbert's list which remains unsolved. These results are about existence and estimation of finite bounds for the number of limit cycles occurring in certain families of ODEs. The book describes this progress, the methods used (bifurcation theory, asymptotic expansions, methods of differential algebra, or geometry) and the specific results obtained. The finiteness conjectures on limit cycles are part of a larger picture that also includes finiteness problems in other areas of mathematics, in particular those in Diophantine geometry where remarkable results were proved during the same period of time. There is a chapter devoted to finiteness results in D The volume can be used as an independent study text for advanced undergraduates and graduate students studying ODEs or applications of differential algebra to differential equations and Diophantine geometry. It is also is a good entry point for researchers interested these areas, in particular, in limit cycles of ODEs, and in finiteness problems. Contributors to the volume include Andrey Bolibrukh and Alexandru Buium. Available from the AMS by A. Buium is Arithmetic Differential Equations, as Volume 118 in the Mathematical Surveys and Monographs series.
Integrability of Dynamical Systems: Algebra and Analysis
Author: Xiang Zhang
Publisher: Springer
Published: 2017-03-30
Total Pages: 380
ISBN-13: 9811042268
DOWNLOAD EBOOK →This is the first book to systematically state the fundamental theory of integrability and its development of ordinary differential equations with emphasis on the Darboux theory of integrability and local integrability together with their applications. It summarizes the classical results of Darboux integrability and its modern development together with their related Darboux polynomials and their applications in the reduction of Liouville and elementary integrabilty and in the center—focus problem, the weakened Hilbert 16th problem on algebraic limit cycles and the global dynamical analysis of some realistic models in fields such as physics, mechanics and biology. Although it can be used as a textbook for graduate students in dynamical systems, it is intended as supplementary reading for graduate students from mathematics, physics, mechanics and engineering in courses related to the qualitative theory, bifurcation theory and the theory of integrability of dynamical systems.
Lectures on Analytic Differential Equations
Author: I͡U. S. Ilʹi͡ashenko
Publisher: American Mathematical Soc.
Published:
Total Pages: 656
ISBN-13: 9780821872482
DOWNLOAD EBOOK →Each section ends with a collection of problems, partly intended to help the reader to gain understanding and experience with the material, partly drafting demonstrations of the more recent results surveyed in the text." "The exposition of the book is mostly geometric, though the algebraic side of the constructions is also prominently featured. On several occasions the reader is introduced to adjacent areas, such as intersection theory for divisors on the projective plane or geometric theory of holomorphic vector bundles with meromorphic connections. The book provides the reader with the principal tools of the modern theory of analytic differential equations and intends to serve as a standard source for references in this area."--BOOK JACKET.
