A family of quadratic polynomial differential systems with algebraic solutions of arbitrary high degree
Abstract
We show that the algebraic curve a0(x)(y-r(x))+p2(x)a'(x)=0, where r(x) and p2(x) are polynomial of degree 1 and 2 respectively and a0(x) is a polynomial solution of the convenient Fucsh's equation, is an invariant curve of the quadratic planar differential system. We study the particular case when a0(x) is an orthogonal polynomials. We prove that that in this case the quadratic differential system is Liouvillian integrable.
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