Isochronicity conditions for some planar polynomial systems II
Abstract
We study the isochronicity of centers at O∈ R2 for systems x=-y+A(x,y),\; y=x+B(x,y), where A,\;B∈ R[x,y], which can be reduced to the Li\'enard type equation. When deg(A)≤ 4 and deg(B) ≤ 4, using the so-called C-algorithm we found 36 new families of isochronous centers. When the Urabe function h=0 we provide an explicit general formula for linearization. This paper is a direct continuation of BoussaadaChouikhaStrelcyn2010 but can be read independantly.
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