Mathieu's equation and its generalizations: Overview of stability charts and their features

Mоlimо vаs kоristitе оvај idеntifikаtоr zа citirаnjе ili оvај link dо оvе stаvkе: https://open.uns.ac.rs/handle/123456789/1753

Nаziv:	Mathieu's equation and its generalizations: Overview of stability charts and their features
Аutоri:	Kovačić, Ivana Rand R. Sah S.
Dаtum izdаvаnjа:	1-мар-2018
Čаsоpis:	Applied Mechanics Reviews
Sažetak:	Copyright © 2018 by ASME. This work is concerned with Mathieu's equation-a classical differential equation, which has the form of a linear second-order ordinary differential equation (ODE) with Cosinetype periodic forcing of the stiffness coefficient, and its different generalizations/extensions. These extensions include: the effects of linear viscous damping, geometric nonlinearity, damping nonlinearity, fractional derivative terms, delay terms, quasiperiodic excitation, or elliptic-type excitation. The aim is to provide a systematic overview of the methods to determine the corresponding stability chart, its structure and features, and how it differs from that of the classical Mathieu's equation.
URI:	https://open.uns.ac.rs/handle/123456789/1753
ISSN:	36900
DOI:	10.1115/1.4039144
Nаlаzi sе u kоlеkciјаmа:	FTN Publikacije/Publications

131

prоvеrеnо 09.09.2023.

42

Prоtеklа nеdеljа
3

Prоtеkli mеsеc
0

prоvеrеnо 10.05.2024.

Prоvеritе

Stаvkе nа DSpace-u su zаštićеnе аutоrskim prаvimа, sа svim prаvimа zаdržаnim, оsim аkо nije drugačije naznačeno.