Local analysis of a polynomial system and its perturbations

On the real (x, y)-plane, we consider an autonomous system of differential equations whose right-hand sides are polynomials of special form in x and y and a perturbed system obtained from the former by varying the coefficients in the class of functions of (x, y) satisfying the Lipschitz condition. We study the behavior of trajectories of the system in a neighborhood of the isolated equilibrium point O = (0, 0). For the main (polynomial) system, we find all possible types of arrangement of the trajectories in a neighborhood of O. For the case in which the system has TO-curves, we give coefficient criteria for each of the possible types of the point O and study conditions under which the type is preserved in the perturbed system.

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