Phase Portrait of the Riccati Quadratic Polynomial Differential Systems

Abstract

In this paper we characterize the phase portrait of the Riccati quadratic polynomial differential systems x= α2(x),y = ky2+β1(x) y + γ2(x), with (x,y)∈R2, γ2(x) non-zero (otherwise the system is a Bernoulli differential system), k≠0 (otherwise the system is a Lienard differential system), β 1(x) a polynomial of degree at most 1, α 2(x) and γ 2(x) polynomials of degree at most 2, and the maximum of the degrees of α2(x) and k y2+β1(x) y + γ2(x) is 2. We give the complete description of their phase portraits in the Poincare disk