Continuing the idea of Part I, we deal with more involved pseudogroup of transformations $\bar{x}=\varphi (x)$, $\bar{y}=L(x)y$, $\bar{z}=M(x)z,\, \ldots $ applied to the first order differential equations including the underdetermined case (i.e. the Monge equation $y^{\prime }=f(x,y,z,z^{\prime })$) and certain differential equations with deviation (if $z=y(\xi (x))$ is substituted). Our aim is to determine complete families of invariants resolving the equivalence problem and to clarify the largest possible symmetries. Together with Part I, this article may be regarded as an introduction into the method of moving frames adapted to the theory of differential and functional-differential equations.
@article{107892,
author = {V\'aclav Tryhuk and Old\v rich Dlouh\'y},
title = {The moving frames for differential equations. II. Underdetermined and functional equations},
journal = {Archivum Mathematicum},
volume = {040},
year = {2004},
pages = {69-88},
zbl = {1117.34058},
mrnumber = {2054874},
language = {en},
url = {http://dml.mathdoc.fr/item/107892}
}
Tryhuk, Václav; Dlouhý, Oldřich. The moving frames for differential equations. II. Underdetermined and functional equations. Archivum Mathematicum, Tome 040 (2004) pp. 69-88. http://gdmltest.u-ga.fr/item/107892/
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