We study the local analytic solutions f of the functional equation f(ψ(zf(z))) = φ(f(z)) for z in some neighborhood of the origin. Whether the solution f vanishes at z = 0 or not plays a critical role for ...We study the local analytic solutions f of the functional equation f(ψ(zf(z))) = φ(f(z)) for z in some neighborhood of the origin. Whether the solution f vanishes at z = 0 or not plays a critical role for local analytic solutions of this equation. In this paper, we obtain results of analytic solutions not only in the case f(0) = 0 but also for f(0) ≠ 0. When assuming f(0) = 0, for technical reasons, we just get the result for f′(0)≠ 0. Then when assuming f(0) = ω0 ≠ 0, ψ(0) = s # 0, ψ(z) is analytic at z = 0 and ψ(z) is analytic at z = ω0, we give the existence of local analytic solutions f in the case of 0 〈 |sω0| 〈 1 and the case of |sω0| = 1 with the Brjuno condition.展开更多
With the straification theory we have proved the transversal layer s 0 3,k (D) of complete equations for mixed fluid is not an empty set: s 0 3,k (D) ≠ for all k(k≥1) . Based on this conclusion a...With the straification theory we have proved the transversal layer s 0 3,k (D) of complete equations for mixed fluid is not an empty set: s 0 3,k (D) ≠ for all k(k≥1) . Based on this conclusion and the “secondary equation” of s 0 3,k (D), this paper fully presents the expressions of coefficients in all local analytic solutions of the equations. Therefore we provide the calculation formulas by which we can get the numerical solutions to any desired accuracy.展开更多
基金supported by National Natural Science Foundation of China(11101295)
文摘We study the local analytic solutions f of the functional equation f(ψ(zf(z))) = φ(f(z)) for z in some neighborhood of the origin. Whether the solution f vanishes at z = 0 or not plays a critical role for local analytic solutions of this equation. In this paper, we obtain results of analytic solutions not only in the case f(0) = 0 but also for f(0) ≠ 0. When assuming f(0) = 0, for technical reasons, we just get the result for f′(0)≠ 0. Then when assuming f(0) = ω0 ≠ 0, ψ(0) = s # 0, ψ(z) is analytic at z = 0 and ψ(z) is analytic at z = ω0, we give the existence of local analytic solutions f in the case of 0 〈 |sω0| 〈 1 and the case of |sω0| = 1 with the Brjuno condition.
文摘With the straification theory we have proved the transversal layer s 0 3,k (D) of complete equations for mixed fluid is not an empty set: s 0 3,k (D) ≠ for all k(k≥1) . Based on this conclusion and the “secondary equation” of s 0 3,k (D), this paper fully presents the expressions of coefficients in all local analytic solutions of the equations. Therefore we provide the calculation formulas by which we can get the numerical solutions to any desired accuracy.
