On the semi-inverse method and variational principle | Zendy

Xuewei Li | Zendy; LI Ya | Zendy; JiHuan He | Zendy

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On the semi-inverse method and variational principle

Author(s) -

Xuewei Li,

LI Ya,

JiHuan He

Publication year - 2013

Publication title -

thermal science

Language(s) - English

Resource type - Journals

SCImago Journal Rank - 0.339

H-Index - 43

eISSN - 2334-7163

pISSN - 0354-9836

DOI - 10.2298/tsci1305565l

Subject(s) - variational principle , equivalence (formal languages) , inverse , chen , inverse method , thermal conduction , mathematics , inverse problem , mathematical physics , calculus (dental) , mathematical analysis , physics , pure mathematics , thermodynamics , geometry , medicine , paleontology , dentistry , biology

In this Open Forum, Liu et al. proved the equivalence between He-Lee 2009 variational principle and that by Tao and Chen (Tao, Z. L., Chen, G. H., Thermal Science, 17(2013), pp. 951-952) for one dimensional heat conduction. We confirm the correction of Liu et al.’s proof, and give a short remark on the history of the semi-inverse method for establishment of a generalized variational principle

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