ISSN 2234-8417 (Online) ISSN 1598-5857 (Print)

Table of Contents
2008's   26,5-6(Sept)
    By M. GHADIRI ..........819
Generic Number - 819
References - 0
Written Date - September 20th, 08
Modified Date - September 20th, 08
Downloaded Counts - 324
Visited Counts - 662
Original File
n-ary Hv-structures is a generalisation of both n-ary struc-
tures and Hv-structures. A wide class of n-ary Hv-groups is the n-ary
P-Hv-groups that is concidered in this paper. In this paper the notion of
a normal subgroup of an n-ary P-Hv-group is introduced and the isomor-
phism theorems for n-ary P-Hv-groups are stated and proved. Also some
examples and related properties are investigated.

SpringerChini-CAM (SpringerChin Institute-CAM) with "Korean SIGCAM and KSCAM"

SpringerChin-CAM연구소(SpringerChin 전산응용수학연구소)
Copyright ⓒ 2020 JAMC, JAMI. All rights reserved.  E-mail :
Main Office Address: c/o Springer Tiergartenstrasse 17 D-69121 Heidelberg, GERMANY.