Titlebook: An Introduction to Piecewise Smooth Dynamics; Paul Glendinning,Mike R. Jeffrey,Elena Bossolini,J Textbook 2019 Springer Nature Switzerland

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书目名称An Introduction to Piecewise Smooth Dynamics被引频次学科排名




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misanthrope

2297-0304 osition theorems and an introduction to kneading theory. Both courses contain many examples which illustrate the theoretical concepts that are introduced. .978-3-030-23688-5978-3-030-23689-2Series ISSN 2297-0304 Series E-ISSN 2297-0312

foreign

Piecewise-smooth Maps,. Other classes exist, but these two form the basis for most studies. The decision about how to define dynamics on the boundaries of the regions can be a bit awkward and will involve us in some little technical issues later.

NOCT

Textbook 2019stems for its own sake. It is divided in two complementary courses: piecewise smooth flows and maps, respectively. Starting from well known theoretical results, the authors bring the reader into the latest challenges in the field, going through stability analysis, bifurcation, singularities, decompo

起皱纹

Textbook 2019l results, the authors bring the reader into the latest challenges in the field, going through stability analysis, bifurcation, singularities, decomposition theorems and an introduction to kneading theory. Both courses contain many examples which illustrate the theoretical concepts that are introduced. .

Amendment

现晕光

Piecewise-smooth Maps,osures of these regions is the whole space, then a piecewise-smooth map is a map on this partition which is defined by a different smooth function on each region. Note that a piecewise-smooth map may be discontinuous across boundaries, or it may be continuous but the Jacobian matrix is discontinuous

金盘是高原

,Gibt es beim Manne „Wechseljahre“?,This course is about the geometry of piecewise-smooth dynamical systems. The solutions of a system of ordinary differential equations, such as . where . is some .-dimensional vector or variable, and . is an .-dimensional vector field, can be pictured as trajectories (or .) in space (for example, . or some subset of it).

Nebulous

Piecewise-smooth Flows,This course is about the geometry of piecewise-smooth dynamical systems. The solutions of a system of ordinary differential equations, such as . where . is some .-dimensional vector or variable, and . is an .-dimensional vector field, can be pictured as trajectories (or .) in space (for example, . or some subset of it).

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