Discusses the use of applied mathematics to solve challenging power system problems. This book covers such areas as: control, ...
WeiterlesenThis book has a rather long-winding history. It is not like anything else the present author ever wrote, as all the rest ...
WeiterlesenAlthough, bifurcation theory of equations with autonomous and periodic time dependence is a major object of research in the ...
WeiterlesenThe authors have presented an extensive revision of the first edition of the Averaging Methods in Nonlinear Dynamical Systems ...
WeiterlesenLeading international researchers and practitioners of bifurcations and instabilities in geomechanics debate the developments ...
WeiterlesenBusiness cycle theory has been one of the fastest growing fields in modern nonlinear economic dynamics. The book is centered ...
WeiterlesenThis volume introduces and reviews novel theoretical approaches to modeling strongly nonlinear behaviour of either individual ...
WeiterlesenThe key concepts of both saddle node and Hopf bifurcation are covered. These are illustrated with the differential-algebraic ...
WeiterlesenThe book systematically covers major foundations of the systems theory. First, the quantitative and qualitative methods of ...
WeiterlesenThis Edition includes detailed discussion and analysis on: General Results and Linear Theory of Delay Equations in Finite ...
WeiterlesenThis Edition includes detailed discussion and analysis on: General Results and Linear Theory of Delay Equations in Finite ...
WeiterlesenThis is an advanced expository book on statistical methods for the Design and Analysis of Simulation Experiments (DASE). ...
WeiterlesenThis textbook contains the lecture series originally delivered at the "Advanced Course on Limit Cycles of Differential Equations" ...
WeiterlesenOnce again KAM theory is committed in the context of nearly integrable Hamiltonian systems. While elliptic and hyperbolic ...
WeiterlesenThe interaction between mathematics and mechanics is a never ending source of new developments. Today, challenging problems ...
WeiterlesenModern notions and important tools of classical mechanics are used in the study of concrete examples that model physically ...
WeiterlesenNonlinear analysis has developed rapidly in the last three decades. Theories, techniques and results in many different branches ...
WeiterlesenDiscrete mathematical modeling is one of the driving factors in modern mathematics research, and has played a role of synthesis ...
WeiterlesenThis book is loaded with rich and stimulating articles by a roster of brilliant scholars, reflecting some recent trends in ...
WeiterlesenStochastic differential equations play an increasingly important role in modeling the dynamics of a large variety of systems ...
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