Example of a function of two variables that cannot be an $R$-function

  • I. G. Velichko Запорож. нац. ун-т
  • P. G. Stegantseva Запорож. нац. ун-т

Abstract

We note that the definition of R-functions depends on the choice of a certain surjection and pose the problem of the construction of a function of two variables that is not an R-function for any choice of a surjective mapping. It is shown that the function $x_1 x_2 − 1$ possesses this property. We prove a theorem according to which, in the case of finite sets, every mapping is an $R$-mapping for a proper choice of a surjection.
Published
25.02.2010
How to Cite
VelichkoI. G., and StegantsevaP. G. “Example of a Function of Two Variables That Cannot Be an $R$-Function”. Ukrains’kyi Matematychnyi Zhurnal, Vol. 62, no. 2, Feb. 2010, pp. 270–274, https://umj.imath.kiev.ua/index.php/umj/article/view/2863.
Section
Short communications