On the number of hyperelliptic limit cycles of Li\'enard systems
Abstract
In this paper, we study the maximum number, denoted by H(m,n), of hyperelliptic limit cycles of the Li\'enard systems x=y, y=-fm(x)y-gn(x), where, respectively, fm(x) and gn(x) are real polynomials of degree m and n, gn(0)=0. The main results of the paper are as follows: In term of m and n of the system, we obtain the upper bound and lower bound of H(m,n) in all the possible cases. Furthermore, these upper bound can be reached in some cases.
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