00837nam0-22002411i-450-990002831270403321000283127FED01000283127(Aleph)000283127FED0100028312720000920d1975----km-y0itay50------baENG<<L'>>analisi del valore . Guida teorico-pratica all'applicazione dell'analisi del valoreper la riduzione sistematica dei costi.di Weiller GuidoMilanoFranco Angeli1975Weiller,Guido105081ITUNINARICAUNIMARCBK9900028312704033215-324-TBTBECAECAAnalisi del valore . Guida teorico-pratica all'applicazione dell'analisi del valoreper la riduzione sistematica dei costi417286UNINAING0102531nam 2200409 450 991079392940332120200317083538.03-8325-8825-6(CKB)4100000010135046(MiAaPQ)EBC60328475e469732-bd10-45cd-861e-4e00b0dd2d03(EXLCZ)99410000001013504620200317d2016 uy 0engurcnu||||||||txtrdacontentcrdamediacrrdacarrierCollective dynamics in complex networks of noisy phase oscillators towards models of neuronal network dynamics /von M.Sc. Bernard SonnenscheinBerlin :Logos Verlag Berlin,[2016]©20161 online resource (vi, 118 pages)PublicationDate: 201611213-8325-4375-9 Includes bibliographical references.Long description: This work aims to contribute to our understanding of the effects of noise and non-uniform interactions in populations of oscillatory units. In particular, we explore the collective dynamics in various extensions of the Kuramoto model. We develop a theoretical framework to study such noisy systems and we show through many examples that indeed new insights can be gained with our method. The first step is to coarse-grain the complex networks. The oscillatory units are then characterized solely by their individual quantities, so that identical units can be grouped together. The second step consists of the ansatz that in all these groups the distributions of the oscillators' phases follow time-dependent Gaussians. We apply this analytical two-step method to oscillator networks with correlations between coupling strengths and natural frequencies, to populations with mixed positive and negative coupling strengths, and to noise-driven active rotators, which can perform excitable dynamics. We calculate the rich phase diagrams that delineate the emergent rhythms. Extensive numerical simulations are performed to show both the validity and the limitations of our theoretical results.OscillationsMathematical modelsOscillationsMathematical models.531.32015118Sonnenschein Bernard1466653MiAaPQMiAaPQMiAaPQBOOK9910793929403321Collective dynamics in complex networks of noisy phase oscillators3677201UNINA