C1 Kustannettu tieteellinen erillisteos
Stability of Axially Moving Materials (2020)


Banichuk, N., Barsuk, A., Jeronen, J., Tuovinen, T., & Neittaanmäki, P. (2020). Stability of Axially Moving Materials. Springer. Solid Mechanics and Its Applications, 259. https://doi.org/10.1007/978-3-030-23803-2


JYU-tekijät tai -toimittajat


Julkaisun tiedot

Julkaisun kaikki tekijät tai toimittajatBanichuk, Nikolay; Barsuk, Alexander; Jeronen, Juha; Tuovinen, Tero; Neittaanmäki, Pekka

ISBN978-3-030-23802-5

eISBN978-3-030-23803-2

Lehti tai sarjaSolid Mechanics and Its Applications

ISSN0925-0042

eISSN2214-7764

Julkaisuvuosi2020

Sarjan numero259

Kirjan kokonaissivumäärä642

KustantajaSpringer

KustannuspaikkaCham

JulkaisumaaSveitsi

Julkaisun kielienglanti

DOIhttps://doi.org/10.1007/978-3-030-23803-2

Julkaisun avoin saatavuusEi avoin

Julkaisukanavan avoin saatavuus


Tiivistelmä

This book discusses the stability of axially moving materials, which are encountered in process industry applications such as papermaking. A special emphasis is given to analytical and semianalytical approaches. As preliminaries, we consider a variety of problems across mechanics involving bifurcations, allowing to introduce the techniques in a simplified setting.

In the main part of the book, the fundamentals of the theory of axially moving materials are presented in a systematic manner, including both elastic and viscoelastic material models, and the connection between the beam and panel models. The issues that arise in formulating boundary conditions specifically for axially moving materials are discussed. Some problems involving axially moving isotropic and orthotropic elastic plates are analyzed. Analytical free-vibration solutions for axially moving strings with and without damping are derived. A simple model for fluid--structure interaction of an axially moving panel is presented in detail.

This book is addressed to researchers, industrial specialists and students in the fields of theoretical and applied mechanics, and of applied and computational mathematics.


YSO-asiasanatmekaniikkavakaus (fysiikka)matemaattiset mallitoptimointibifurkaatio

Vapaat asiasanatbifurcations; optimization of mechanical systems; moving materials; mechanical behaviour of manufacturing; bifurcation in materials; bifurcation in engineering; instability parameters; imperfections in stability theory; optimization problems in mechanics


Liittyvät organisaatiot


OKM-raportointiKyllä

Raportointivuosi2020

JUFO-taso1


Viimeisin päivitys 2024-03-04 klo 21:07