English

On a functional-differential equation with quasi-arithmetic mean value

Classical Analysis and ODEs 2020-05-19 v1

Abstract

In this paper we describe all differentiable functions φ,ψ ⁣:ER\varphi,\psi\colon E\to\mathbb{R} satisfying the functional-differential equation \begin{equation*} [\varphi(y) - \varphi(x)]\psi '\bigl(h(x,y)\bigr) = [\psi(y) - \psi(x)]\varphi '\bigl(h(x,y)\bigr), \end{equation*} for all x,yEx,y\in E, x<yx<y, where ERE \subseteq \mathbb{R} is a nonempty open interval, h(,)h(\cdot,\cdot) is a quasi-arithmetic mean, i.e. h(x,y)=H1(αH(x)+βH(y))h(x,y)=H^{-1}(\alpha H (x)+\beta H (y)), x,yEx,y\in E, for some differentiable and strictly monotone function H ⁣:EH(E)H\colon E \to H(E) and fixed α,β(0,1)\alpha, \beta\in (0,1) with α+β=1\alpha+\beta=1.

Keywords

Cite

@article{arxiv.2005.08369,
  title  = {On a functional-differential equation with quasi-arithmetic mean value},
  author = {Shokhrukh Ibragimov},
  journal= {arXiv preprint arXiv:2005.08369},
  year   = {2020}
}
R2 v1 2026-06-23T15:36:37.517Z