Isogeometric collocation mixed methods for rods | Zendy

Ferdinando Auricchio | Zendy; L. Beirão da Veiga | Zendy; Josef Kiendl | Zendy; Carlo Lovadina | Zendy; Alessandro Reali | Zendy

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Isogeometric collocation mixed methods for rods

Author(s) -

Ferdinando Auricchio,

L. Beirão da Veiga,

Josef Kiendl,

Carlo Lovadina,

Alessandro Reali

Publication year - 2015

Publication title -

discrete and continuous dynamical systems - s

Language(s) - English

Resource type - Journals

SCImago Journal Rank - 0.481

H-Index - 34

eISSN - 1937-1632

pISSN - 1937-1179

DOI - 10.3934/dcdss.2016.9.33

Subject(s) - collocation (remote sensing) , isogeometric analysis , stability (learning theory) , convergence (economics) , mathematics , collocation method , rod , mathematical analysis , computer science , physics , finite element method , medicine , thermodynamics , ordinary differential equation , alternative medicine , pathology , machine learning , economics , differential equation , economic growth

Isogeometric collocation mixed methods for spatial rods are presented and studied. A theoretical analysis of stability and convergence is available. The proposed schemes are locking-free, irrespective of the selected approximation spaces.

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