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    Jet schemes for advection problems

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    Genre
    Journal Article
    Date
    2012-06-01
    Author
    Seibold, B
    Rosales, RR
    Nave, JC
    Subject
    Jet schemes
    gradient-augmented
    advection
    cubic
    quintic
    high-order
    superconsistency
    Permanent link to this record
    http://hdl.handle.net/20.500.12613/6003
    
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    DOI
    10.3934/dcdsb.2012.17.1229
    Abstract
    We present a systematic methodology to develop high order accurate numerical approaches for linear advection problems. These methods are based on evolving parts of the jet of the solution in time, and are thus called jet schemes. Through the tracking of characteristics and the use of suitable Hermite interpolations, high order is achieved in an optimally local fashion, i.e. the update for the data at any grid point uses information from a single grid cell only. We show that jet schemes can be interpreted as advect- and-project processes in function spaces, where the projection step minimizes a stability functional. Furthermore, this function space framework makes it possible to systematically inherit update rules for the higher derivatives from the ODE solver for the characteristics. Jet schemes of orders up to five are applied in numerical benchmark tests, and systematically compared with classical WENO finite difference schemes. It is observed that jet schemes tend to possess a higher accuracy than WENO schemes of the same order.
    Citation to related work
    American Institute of Mathematical Sciences (AIMS)
    Has part
    Discrete and Continuous Dynamical Systems - Series B
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    ae974a485f413a2113503eed53cd6c53
    http://dx.doi.org/10.34944/dspace/5985
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