summary:We consider the functional equation $f(xf(x))=\varphi (f(x))$ where $\varphi \: J\rightarrow J$ is a given increasing homeomorphism of an open interval $J\subset (0,\infty )$ and $f\: (0,\infty )\rightarrow J$ is an unknown continuous function. In a series of papers by P. Kahlig and J. Smítal it was proved that the range of any non-constant solution is an interval whose end-points are fixed under $\varphi $ and which contains in its interior no fixed point except for $1$. They also provide a characterization of the class of monotone solutions and prove a necessary and sufficient condition for any solution to be monotone. In the present paper we give a characterization of the class of continuous solutions of this equation: We describ...
AbstractWe extend some results on existence and approximation of solution for a class of first-order...
AbstractIn this paper we study functional φ-Laplacian equations with functional boundary conditions....
In this paper we investigate a system of functional equations J N O N = id \ W o/* = /„_!_* o AT k...
summary:We consider the functional equation $f(xf(x))=\varphi (f(x))$ where $\varphi \: J\rightarrow...
summary:We consider the functional equation $f(xf(x))=\varphi (f(x))$ where $\varphi \: J\rightarrow...
summary:We consider the functional equation $f(xf(x))=\varphi (f(x))$ where $\varphi \: J\rightarrow...
W pracy dowodzi się twierdzenia które orzeka, że jeżeli dane funkcje f i h są monofoniczne (względn...
AbstractWe consider the difference equation xn+1=F(xn,xn−1),n=0,1,…, where the function F(u,v) is co...
AbstractIn this paper we give a new proof of a classical result by Fréchet [M. Fréchet, Une définiti...
We investigate the existence and uniqueness of solutions ϕ: I → J of the functional equation ϕfx ...
We study the problem of the existence of increasing and continuous solutions φ :[0 , 1] → [0 , 1] su...
AbstractThe main result of this work states that if f:R+m→R+m is increasing and continuous and the s...
This paper considers a nth-order phi-laplacian differential equation with functional boundary condit...
The aim of this note is to prove the monotonicity formula of Caffarelli-Jerison-Kenig for functions,...
Inspired by a problem by J. Matkowski in [Aequationes Math. 80 (2010), no. 1-2, 181–192; MR2736949] ...
AbstractWe extend some results on existence and approximation of solution for a class of first-order...
AbstractIn this paper we study functional φ-Laplacian equations with functional boundary conditions....
In this paper we investigate a system of functional equations J N O N = id \ W o/* = /„_!_* o AT k...
summary:We consider the functional equation $f(xf(x))=\varphi (f(x))$ where $\varphi \: J\rightarrow...
summary:We consider the functional equation $f(xf(x))=\varphi (f(x))$ where $\varphi \: J\rightarrow...
summary:We consider the functional equation $f(xf(x))=\varphi (f(x))$ where $\varphi \: J\rightarrow...
W pracy dowodzi się twierdzenia które orzeka, że jeżeli dane funkcje f i h są monofoniczne (względn...
AbstractWe consider the difference equation xn+1=F(xn,xn−1),n=0,1,…, where the function F(u,v) is co...
AbstractIn this paper we give a new proof of a classical result by Fréchet [M. Fréchet, Une définiti...
We investigate the existence and uniqueness of solutions ϕ: I → J of the functional equation ϕfx ...
We study the problem of the existence of increasing and continuous solutions φ :[0 , 1] → [0 , 1] su...
AbstractThe main result of this work states that if f:R+m→R+m is increasing and continuous and the s...
This paper considers a nth-order phi-laplacian differential equation with functional boundary condit...
The aim of this note is to prove the monotonicity formula of Caffarelli-Jerison-Kenig for functions,...
Inspired by a problem by J. Matkowski in [Aequationes Math. 80 (2010), no. 1-2, 181–192; MR2736949] ...
AbstractWe extend some results on existence and approximation of solution for a class of first-order...
AbstractIn this paper we study functional φ-Laplacian equations with functional boundary conditions....
In this paper we investigate a system of functional equations J N O N = id \ W o/* = /„_!_* o AT k...