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CONSERVATION LAWS FOR THE (1+2)-DIMENSIONAL WAVE EQUATION IN BIOLOGICAL ENVIRONMENT

CONSERVATION LAWS FOR THE (1+2)-DIMENSIONAL WAVE EQUATION IN BIOLOGICAL ENVIRONMENT
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摘要 The derivation of conservation laws for the wave equation on sphere, cone and flat space is considered. The partial Noether approach is applied for wave equation on curved surfaces in terms of the coefficients of the first fundamental form (FFF) and the partial Noether operator's determining equations are derived. These determining equations are then used to construct the partial Noether operators and conserved vectors for the wave equation on different surfaces. The conserved vectors for the wave equation on the sphere, cone and fiat space are simplified using the Lie point symmetry generators of the equation and conserved vectors with the help of the symmetry conservation laws relation. The derivation of conservation laws for the wave equation on sphere, cone and flat space is considered. The partial Noether approach is applied for wave equation on curved surfaces in terms of the coefficients of the first fundamental form (FFF) and the partial Noether operator's determining equations are derived. These determining equations are then used to construct the partial Noether operators and conserved vectors for the wave equation on different surfaces. The conserved vectors for the wave equation on the sphere, cone and fiat space are simplified using the Lie point symmetry generators of the equation and conserved vectors with the help of the symmetry conservation laws relation.
作者 Adil JHANGEER
机构地区 Deanship of Educational Services
出处 《Acta Mathematica Scientia》 SCIE CSCD 2013年第5期1255-1268,共14页 数学物理学报(B辑英文版)
关键词 partial Noether operators first fundamental form (FFF) conservation laws partial Noether operators first fundamental form (FFF) conservation laws
分类号 O175 [理学—基础数学]
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参考文献25

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Acta Mathematica Scientia
2013年 第5期

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