Supernormal subhypergroup: Difference between revisions

Latest revision as of 20:04, 24 August 2008

ANALOGY: This is an analogue in hypergroup of a property encountered in group. Specifically, it is a subhypergroup property analogous to the subgroup property: normal subgroup
View other analogues of normal subgroup | View other analogues in hypergroups of subgroup properties (OR, View as a tabulated list)

History

Origin

The term supernormal subhypergroup was introduced by Bloom and Heyer in their paper Cpnvergence of convolution products of probability measures on hypergroups.

Definition

A subhypergroup $H$ of a hypergroup $K$ is said to be supernormal if $x * H * \bar{x} = H$ for every element $x \in K$ .

Analogy

The subhypergroup property of being supernormal is analogous to the subgroup property of being normal, as per the following definition: a subgroup $H$ of a group $K$ is said to be normal if $x H x^{- 1} = H$ for any $x \in K$ .

Relation with other properties

Weaker properties

Normal subhypergroup

References

Convergence of convolutions products of probability measures on hypergroups by W. R. Bloom and H. Heyer, Rend. Mat. Appl. 7, Serial 2, 547-563, 1982
Connectivity and supernormality results for hypergroups by Richard C. Vrem, Math. Z. 1987

@@ Line 1: / Line 1: @@
 {{subhypergroup property}}
-{{hypergroup analogue of|normality}}
+{{analogue of property|
+old generic context = group|
+old specific context = subgroup|
+new generic context = hypergroup|
+new specific context = subhypergroup|
+old property = normal subgroup}}
 ==History==
@@ Line 8: / Line 12: @@
 ===Origin===
-The term ''supernormal subhypergroup''' was introduced by Bloom and Heyer in their paper ''Cpnvergence of convolution products of probability measures on hypergroups''.
+The term ''supernormal subhypergroup'' was introduced by Bloom and Heyer in their paper ''Cpnvergence of convolution products of probability measures on hypergroups''.
 ==Definition==