Sie sind bereits eingeloggt. Klicken Sie auf 2. tolino select Abo, um fortzufahren.
Bitte loggen Sie sich zunächst in Ihr Kundenkonto ein oder registrieren Sie sich bei bücher.de, um das eBook-Abo tolino select nutzen zu können.
This book presents exact, closed-form solutions for the response of a variety of nonlinear oscillators (free, damped, forced). The solutions presented are expressed in terms of special functions. To help the reader understand these `non-standard' functions, detailed explanations and rich illustrations of their meanings and contents are provided. In addition, it is shown that these exact solutions in certain cases comprise the well-known approximate solutions for some nonlinear oscillations.
This book presents exact, closed-form solutions for the response of a variety of nonlinear oscillators (free, damped, forced). The solutions presented are expressed in terms of special functions. To help the reader understand these `non-standard' functions, detailed explanations and rich illustrations of their meanings and contents are provided. In addition, it is shown that these exact solutions in certain cases comprise the well-known approximate solutions for some nonlinear oscillations.
Ivana Kovacic is a Full Professor of Mechanics at the Faculty of Technical Sciences, University of Novi Sad, Serbia, and the Head of the Centre for Vibro-Acoustic Systems and Signal Processing CEVAS at the same faculty. Her research involves the use of quantitative and qualitative methods to study governing equations arising from nonlinear dynamics problems. She is the editor/author of the books ‘The Duffing Equation: Nonlinear Oscillators and their Behaviour’ and ‘Mechanical Vibrations: Fundamentals with Solved Examples’ (both published by Wiley) as well as two textbooks in Serbian. She is a Subject Editor in three academic journals: Journal of Sound and Vibration (Elsevier), Mechanics Research Communications (Elsevier) and Meccanica (Springer).
Inhaltsangabe
Chapter1. Oscillators and Oscillatory Responses in Practical and Theoretical Systems.- Chapter2. Free Conservative Oscillators: from Linear to Nonlinear Systems.- Chapter3. Free Damped Oscillators.- Chapter4. Forced Oscillators.- Chapter5. Nonlinear Isochronous Oscillators.- Chapter6. From Chains of Nonlinear Oscillators to Continuous Nonlinear Systems
Chapter1. Oscillators and Oscillatory Responses in Practical and Theoretical Systems.- Chapter2. Free Conservative Oscillators: from Linear to Nonlinear Systems.- Chapter3. Free Damped Oscillators.- Chapter4. Forced Oscillators.- Chapter5. Nonlinear Isochronous Oscillators.- Chapter6. From Chains of Nonlinear Oscillators to Continuous Nonlinear Systems
Chapter1. Oscillators and Oscillatory Responses in Practical and Theoretical Systems.- Chapter2. Free Conservative Oscillators: from Linear to Nonlinear Systems.- Chapter3. Free Damped Oscillators.- Chapter4. Forced Oscillators.- Chapter5. Nonlinear Isochronous Oscillators.- Chapter6. From Chains of Nonlinear Oscillators to Continuous Nonlinear Systems
Chapter1. Oscillators and Oscillatory Responses in Practical and Theoretical Systems.- Chapter2. Free Conservative Oscillators: from Linear to Nonlinear Systems.- Chapter3. Free Damped Oscillators.- Chapter4. Forced Oscillators.- Chapter5. Nonlinear Isochronous Oscillators.- Chapter6. From Chains of Nonlinear Oscillators to Continuous Nonlinear Systems
Rezensionen
"The book is well written and very easy to read. From the first pages, where the reader finds the motivation, it is an engaging and informatively very beneficial reading. The connection of mechanics and mathematics is described as well. The text is complemented by illustrative pictures." (Petr Hasil, Mathematical Reviews, October, 2022)
Es gelten unsere Allgemeinen Geschäftsbedingungen: www.buecher.de/agb
Impressum
www.buecher.de ist ein Internetauftritt der buecher.de internetstores GmbH
Geschäftsführung: Monica Sawhney | Roland Kölbl | Günter Hilger
Sitz der Gesellschaft: Batheyer Straße 115 - 117, 58099 Hagen
Postanschrift: Bürgermeister-Wegele-Str. 12, 86167 Augsburg
Amtsgericht Hagen HRB 13257
Steuernummer: 321/5800/1497