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Statements

Subject Item
n2:RIV%2F61989100%3A27230%2F09%3A00020229%21RIV10-MSM-27230___
rdf:type
skos:Concept n7:Vysledek
dcterms:description
For the numerical solution of elastoplastic problems with use of Newton Raphson method in global equilibrium equation it is necessary to determine the tangent modulus in each integration point. To reach the parabolic convergence of Newton Raphson method it is convenient to use so called algorithmic tangent modulus which is consistent with used integration scheme. For more simple models for example chaboche combined Hardening model it is posible to determine it in analytical wax. For the numerical solution of elastoplastic problems with use of Newton Raphson method in global equilibrium equation it is necessary to determine the tangent modulus in each integration point. To reach the parabolic convergence of Newton Raphson method it is convenient to use so called algorithmic tangent modulus which is consistent with used integration scheme. For more simple models for example chaboche combined Hardening model it is posible to determine it in analytical wax.
dcterms:title
Tangent Modulus in Numerical Integration of Constitutive Relations and its Influence on Convergence of NR Method Tangent Modulus in Numerical Integration of Constitutive Relations and its Influence on Convergence of NR Method
skos:prefLabel
Tangent Modulus in Numerical Integration of Constitutive Relations and its Influence on Convergence of NR Method Tangent Modulus in Numerical Integration of Constitutive Relations and its Influence on Convergence of NR Method
skos:notation
RIV/61989100:27230/09:00020229!RIV10-MSM-27230___
n5:aktivita
n18:Z
n5:aktivity
Z(MSM6198910027)
n5:cisloPeriodika
1
n5:dodaniDat
n14:2010
n5:domaciTvurceVysledku
n13:6736084 n13:5047854
n5:druhVysledku
n15:J
n5:duvernostUdaju
n16:S
n5:entitaPredkladatele
n9:predkladatel
n5:idSjednocenehoVysledku
345366
n5:idVysledku
RIV/61989100:27230/09:00020229
n5:jazykVysledku
n11:eng
n5:klicovaSlova
FEM; implicit stress integration; coststent tangent modulus; Newton-Raphson method
n5:klicoveSlovo
n6:coststent%20tangent%20modulus n6:FEM n6:Newton-Raphson%20method n6:implicit%20stress%20integration
n5:kodStatuVydavatele
CZ - Česká republika
n5:kontrolniKodProRIV
[04B94D59F47A]
n5:nazevZdroje
Applied and Computational Mechanics
n5:obor
n8:JJ
n5:pocetDomacichTvurcuVysledku
2
n5:pocetTvurcuVysledku
2
n5:rokUplatneniVysledku
n14:2009
n5:svazekPeriodika
3
n5:tvurceVysledku
Poruba, Zdeněk Halama, Radim
n5:zamer
n12:MSM6198910027
s:issn
1802-680X
s:numberOfPages
12
n17:organizacniJednotka
27230