Partial difference equations arising from the Cauchy-Riemann equations

S. Haruki, S. Nakagiri

Abstract


We consider some functional equations arising from the Cauchy-Riemann equations, and certain related functional equations. First we propose a new functional equation (E.1) below, over a $2$-divisible Abelian group, which is a discrete version of the Cauchy-Riemann equations, and give the general solutions of (E.1). Next we study a functional equation which is equivalent to (E.1). Further we propose and solve partial difference-differential functional equations and nonsymmetric partial difference equations which are also arising from the Cauchy--Riemann equations.
\[
f(x+t,y)- f(x-t,y) = - i [f(x,y+t)- f(x,y-t)].    (E.1)
\]

Mathematics Subject Classification


2000 Mathematics Subject Classification: 39B52

Full Text: PDF

Download statistics: 3255



e-ISSN: 2300-133X, ISSN: 2081-545X

Since 2017 Open Access in De Gruyter and CrossCheck access cofinanced by The Ministry of Science and Higher Education - Republic of Poland - DUN 775/P-DUN/2017 see more

The Journal is indexed in:
and others see Abstracting and Indexing list

AUPC SM is on the List of the Ministry’s scored journals with 20 points for 2019

Deklaracja dostępności cyfrowej