On a functional equation related to two-variable weighted quasi-arithmetic means

In this paper, we are going to describe the solutions of the functional equation $$\varphi\Big(\frac{x+y}{2}\Big)(f(x)+f(y))=\varphi(x)f(x)+\varphi(y)f(y)$$ concerning the unknown functions $\varphi$ and $f$ defined on an open interval. In our main result only the continuity of the function $\varphi$ and a regularity property of the set of zeroes of $f$ are assumed. As application, we determine the solutions of the functional equation $$G(g(u)-g(v))=H(h(u)+h(v))+F(u)+F(v)$$ under monotonicity and differentiability conditions on the unknown functions $F,G,H,g,h$

On derivations with respect to finite sets of smooth functions

The purpose of this paper is to show that functions that derivate the two-variable product function and one of the exponential, trigonometric or hyperbolic functions are also standard derivations. The more general problem considered is to describe finite sets of differentiable functions such that derivations with respect to this set are automatically standard derivations

On the equality problem of generalized Bajraktarevi\'c means

The purpose of this paper is to investigate the equality problem of generalized Bajraktarevi\'c means, i.e., to solve the functional equation \begin{equation}\label{E0}\tag{*} f^{(-1)}\bigg(\frac{p_1(x_1)f(x_1)+\dots+p_n(x_n)f(x_n)}{p_1(x_1)+\dots+p_n(x_n)}\bigg)=g^{(-1)}\bigg(\frac{q_1(x_1)g(x_1)+\dots+q_n(x_n)g(x_n)}{q_1(x_1)+\dots+q_n(x_n)}\bigg), \end{equation} which holds for all $x=(x_1,\dots,x_n)\in I^n$, where $n\geq 2$, $I$ is a nonempty open real interval, the unknown functions $f,g:I\to\mathbb{R}$ are strictly monotone, $f^{(-1)}$ and $g^{(-1)}$ denote their generalized left inverses, respectively, and $p=(p_1,\dots,p_n):I\to\mathbb{R}_{+}^n$ and $q=(q_1,\dots,q_n):I\to\mathbb{R}_{+}^n$ are also unknown functions. This equality problem in the symmetric two-variable (i.e., when $n=2$) case was already investigated and solved under sixth-order regularity assumptions by Losonczi in 1999. In the nonsymmetric two-variable case, assuming three times differentiability of $f$, $g$ and the existence of $i\in\{1,2\}$ such that either $p_i$ is twice continuously differentiable and $p_{3-i}$ is continuous on $I$, or $p_i$ is twice differentiable and $p_{3-i}$ is once differentiable on $I$, we prove that \eqref{E0} holds if and only if there exist four constants $a,b,c,d\in\mathbb{R}$ with $ad\neq bc$ such that \begin{equation*} cf+d>0,\qquad g=\frac{af+b}{cf+d},\qquad\mbox{and}\qquad q_\ell=(cf+d)p_\ell\qquad (\ell\in\{1,\dots,n\}). \end{equation*} In the case $n\geq 3$, we obtain the same conclusion with weaker regularity assumptions. Namely, we suppose that $f$ and $g$ are three times differentiable, $p$ is continuous and there exist $i,j,k\in\{1,\dots,n\}$ with $i\neq j\neq k\neq i$ such that $p_i,p_j,p_k$ are differentiable

Convexity and a Stone-type theorem for convex sets in abelian semigroup setting

In this paper, two parallel notions of convexity of sets are introduced in the abelian semigroup setting. The connection of these notions to algebraic and to set-theoretic operations is investigated. A formula for the computation of the convex hull is derived. Finally, a Stone-type separation theorem for disjoint convex sets is established