Abstract
It is not always possible and sometimes not even advantageous to write the solutions of a system of differential equations explicitly in terms of elementary functions. Sometimes, though, it is possible to find elementary functions which are constant on solution curves, that is, elementary first integrals. These first integrals allow one to occasionally deduce properties that an explicit solution would not necessarily reveal. Consider the following example.
Cite
CITATION STYLE
Prelle, M. J., & Singer, M. F. (1981). Elementary first integrals of differential equations. In Proceedings of the 4th ACM Symposium on Symbolic and Algebraic Computation, SYMSAC 1981 (pp. 30–35). Association for Computing Machinery, Inc. https://doi.org/10.1145/800206.806368
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