On the isoclines of polynomial vector fields

V. M. Cheresiz

doi:10.1007/bf02104723

journal article Nov 01, 1994

On the isoclines of polynomial vector fields

V. M. Cheresiz

Siberian Mathematical Journal Vol. 35 No. 6 pp. 1234-1239 · Springer Science and Business Media LLC

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References

3

[1]

Tung Chin-chi, “Positions of limit cycles of the system $$\frac{{dx}}{{dt}} = \sum\limits_{0 \leqslant i + k \leqslant 2} {a_{ik} x^i y^k ,} \frac{{dy}}{{dt}} = \sum\limits_{0 \leqslant i + k \leqslant 2} {b_{ik} x^i y^k } $$ ,” Matematika,6, No. 2, 150–168 (1962).

[2]

Mathematical Encyclopedia. Vol. 3 [in Russian], Sov. Èntsiklopediya, Moscow (1982).

[3]

M. Bôcher, Introduction to Higher Algebra [Russian translation], Gostekhizdat, Moscow-Leningrad (1933).

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Published: Nov 01, 1994
Vol/Issue: 35(6)
Pages: 1234-1239
License: View

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V. M. Cheresiz

Cite This Article

V. M. Cheresiz (1994). On the isoclines of polynomial vector fields. Siberian Mathematical Journal, 35(6), 1234-1239. https://doi.org/10.1007/bf02104723

On the isoclines of polynomial vector fields

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