# Exponentially convergent parallel discretization methods for the first order evolution equations.

Computational Methods in Applied Mathematics (2001)

- Volume: 1, Issue: 4, page 333-355
- ISSN: 1609-4840

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topGavrilyuk, I., and Makarov, V.. "Exponentially convergent parallel discretization methods for the first order evolution equations.." Computational Methods in Applied Mathematics 1.4 (2001): 333-355. <http://eudml.org/doc/225155>.

@article{Gavrilyuk2001,

author = {Gavrilyuk, I., Makarov, V.},

journal = {Computational Methods in Applied Mathematics},

keywords = {evolution equation; strongly -positive operator; parallel computation; initial value problem; Banach space; Dunford-Cauchy integral; Sinc quadrature formula; strongly -positive operator},

language = {eng},

number = {4},

pages = {333-355},

publisher = {Institute of Mathematics of the National Academy of Sciences of Belarus},

title = {Exponentially convergent parallel discretization methods for the first order evolution equations.},

url = {http://eudml.org/doc/225155},

volume = {1},

year = {2001},

}

TY - JOUR

AU - Gavrilyuk, I.

AU - Makarov, V.

TI - Exponentially convergent parallel discretization methods for the first order evolution equations.

JO - Computational Methods in Applied Mathematics

PY - 2001

PB - Institute of Mathematics of the National Academy of Sciences of Belarus

VL - 1

IS - 4

SP - 333

EP - 355

LA - eng

KW - evolution equation; strongly -positive operator; parallel computation; initial value problem; Banach space; Dunford-Cauchy integral; Sinc quadrature formula; strongly -positive operator

UR - http://eudml.org/doc/225155

ER -

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