Equivalence of Riccati equations with periodic coefficients (Q1778185)

Sufficient conditions for the topological equivalence of two Riccati equations with periodic coefficients of the form \[ {dx\over dt}= a_{2k}(t) x^2+ a_{1k}(t)x+ a_{0k}(t), \] where \(a_{jk}(t)\), \(j= 0,1,2\); \(k= 1,2\), are \(1\)-periodic holomorphic functions on \(\mathbb{R}\), are derived.