DOIAbstract
AbstractIn this paper, we shall apply an operator method for casting and solving the distributional analog of functional equations. In particular, the method will be employed to solve f1(x + y) + f2 (x - y) + f3(xy) =
AbstractIn this paper, we shall apply an operator method for casting and solving the distributional analog of functional equations. In particular, the method will be employed to solve f1(x + y) + f2 (x - y) + f3(xy) =
[[abstract]]In this study we let D be the space of innitely dierentiable func- tions with compact su...
Functional equations appear frequently in Mathematical Olympiads. In this article we focus on some t...
In this paper we solve the functional equation H [tau(F,G), chi (F,G)] = H (F,G) where the unknowns ...
AbstractIn this paper, we shall apply an operator method for casting and solving the distributional ...
AbstractIn this article, we present the most general solution of the functional equationsf(xy)+f((1−...
AbstractWe solve the functional equation F1(t)−F1(t+s)=F2[F3(t)+F4(s)] for real functions defined on...
Abstract A differential equation is a relationship between a function and its deriva-tives which are...
This note deals with finding the solution of a functional equation, where the function involved has ...
AbstractA constructive method for producing a test function space and hence a generalized function s...
Solutions of dual series equations are devised by multyiplying factor technique and Abel integral eq...
The aim of this paper is to present the method of deriving the formula for a solution of the wave eq...
In a simple but mathematically coherent manner, this text examines the basis of the distribution the...
We analyse the solvability of a special form of distributed order fractional differential equations ...
peer reviewedIn this paper we study the Fréchet functional equation in the n-dimensional Euclidian s...
We consider an -dimensional version of the functional equations of Aczél and Chung in the spa...
[[abstract]]In this study we let D be the space of innitely dierentiable func- tions with compact su...
Functional equations appear frequently in Mathematical Olympiads. In this article we focus on some t...
In this paper we solve the functional equation H [tau(F,G), chi (F,G)] = H (F,G) where the unknowns ...
AbstractIn this paper, we shall apply an operator method for casting and solving the distributional ...
AbstractIn this article, we present the most general solution of the functional equationsf(xy)+f((1−...
AbstractWe solve the functional equation F1(t)−F1(t+s)=F2[F3(t)+F4(s)] for real functions defined on...
Abstract A differential equation is a relationship between a function and its deriva-tives which are...
This note deals with finding the solution of a functional equation, where the function involved has ...
AbstractA constructive method for producing a test function space and hence a generalized function s...
Solutions of dual series equations are devised by multyiplying factor technique and Abel integral eq...
The aim of this paper is to present the method of deriving the formula for a solution of the wave eq...
In a simple but mathematically coherent manner, this text examines the basis of the distribution the...
We analyse the solvability of a special form of distributed order fractional differential equations ...
peer reviewedIn this paper we study the Fréchet functional equation in the n-dimensional Euclidian s...
We consider an -dimensional version of the functional equations of Aczél and Chung in the spa...
[[abstract]]In this study we let D be the space of innitely dierentiable func- tions with compact su...
Functional equations appear frequently in Mathematical Olympiads. In this article we focus on some t...
In this paper we solve the functional equation H [tau(F,G), chi (F,G)] = H (F,G) where the unknowns ...
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