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Algebraic differential equations with a maximal number of polynomial solutions of given structure. (Russian) Zbl 0668.34008
Let G(z) and H(z) be polynomials of complex variable, z and $$\epsilon_ t$$ roots of the equation $$\epsilon^{\delta}=1$$, $$\delta\in N$$. P. R. Lazov [Approximate methods for investigating, differential equations and their applications, Kujbyshev 1979, 112-118 (1979; Zbl 0485.34005)] studied when all polynomials of the family $$\omega =\epsilon_ tG(z)+H(z),$$ $$t=1,...,\delta$$ are solutions of algebraic differential equations of special forms. Similar questions are here considered for algebraic equations $$\sum^{N}_{i=0}B_ i(z)\prod^{S_ i}_{k=1}\{\omega^{(\ell_{ki})}\}^{V_{k_ i}}=0$$ and $$\sum^{T}_{i=0}A_ i(z)\omega^{(\gamma_ i)}+\sum^{T}_{\ell =0}B_{\ell}(z)\{\omega^{(\rho)}\}^{\lambda_{\ell}}=0.$$
Reviewer: J.H.Tian
##### MSC:
 34M99 Ordinary differential equations in the complex domain 34C99 Qualitative theory for ordinary differential equations