2 edition of Hypergroups, weighted hypergroups, and modification by multipliers. found in the catalog.
Hypergroups, weighted hypergroups, and modification by multipliers.
Written in English
Thesis (Ph.D.)-Universityof Sheffield, Dept. of Mathematics, 1983.
Subscribe Book Shop Travel With Us SmartNews History Science Ingenuity Arts & Culture Travel At the Smithsonian Photos Video Games Magazine Newsletters. Soil Has a . Extensions of Pontryagin hypergroups from group-theoretic objects as for example orbital actions and Gelfand pairs. This new aspect is illustrated in Examples and In order to investigate the structure of hypergroups it wiII be essential to determine all extensions K of L by H for given commutative hypergroups H and L.
\ WHO WE ARE. Are we governed by unconscious processes of the ordinary? The conventional, the static, the easy, the monotonous, the repetitive, the normal, the classic, the simple, the vulnerable. FORTIFIED JOIN HYPERGROUPS G. G. Massouros, Ch.G. Massouros and I.D. Mittas Ann. Math. Blaise Pascal, Vol. 3, N° 2, , pp. ABSTRACT: In this paper appears a study of certain fundamental properties of a new hypergroup which came into being during to approach of the theory of Language and Automata with the help of the hypercompositional by:
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We also examine our results on three classes of discrete weighted hypergroups constructed by conjugacy classes of FC groups, the dual space of compact groups.
Hypergroups, as I understand them, have been around since the early ’s when Charles Dunkl, Robert Jewett and René Spector independently created locally compact hypergroups with the purpose of doing standard harmonic analysis.
As one would expect, there Cited by: HyperGroups has 24 repositories available. Follow their code on GitHub. Multipliers results on compact hypergroups any open set containing x then μ(V) > 0}.Ifx ∈ H, δ x is the point mass at unspeciﬁed topology on M+(H) is the cone this paper we are using the following deﬁnition of a : Norbert Youmbi.
Title: Hypergroups and Hypergroup Algebras. Authors: Grigory L. Litvinov (Submitted on 29 Sep ) Abstract: The survey contains a brief description of the ideas, constructions, results, and prospects of the theory of hypergroups and generalized translation operators.
Representations of hypergroups are considered, being treated as continuous Cited by: 6. Haar measure. Basic results from prove the existence and uniqueness of the Haar measure for locally compact commutative hypergroups as well as for discrete hypergroups.
The compact case has been settled independently and in a different way in, which imitates a construction by A. the non-compact case, Spector's proof involves a deep new fixed-point theorem for not necessarily affine.
Hypergroups Related to a Pair of Compact Hypergroups 5 Now, let H 0 be a subhypergroup of Hwhich is assumed to be also of strong type and such that jH=H 0j. After introducing the notion of hypergroups by Marty, a number of generalizations of this fundamental concept has been studied.
In this paper, we study a special type of hypergroups; single power. plural of hypergroup Definition from Wiktionary, the free dictionary.
We study some connections between hypergroups and n-hypergroups. For each of them we give examples which involve binary relations, lattices and hypergraphs. Finally, we study when two finite join spaces associated with lattices, defined on the same set, are by: Internal.
Math. & Math. Sci. VOL. 14 NO. 2 () ONTHESEMI-SUB-HYPERGROUPSOFAHYPERGROUP CH. MASSOUROS 54 Klious Street 6| Cholargos Athens, Greece (Received Octo and in revised form December 5, ) ABSTRACT.
In this paper we study some properties of the seml-sub-hypergroups and the closed sub-hypergroups of the hypergroups. ﬁnite groups and character hypergroups, referring to Issacs’s book  and Roth’s paper . Let Gbe a ﬁnite group and Fbe a ﬁeld.
Also, let V be a ﬁnite dimensional vector space on F.A representation of Gover V is a homomorphism T: G−→ GL(V),T(xy) = T(x)T(y); ∀x,y∈ G. A representation T of Gis called irreducible, if V is. For arbitrary hypergroups with an invariant measure, we derive a Harnack inequality for pos- ive harmonic functions and prove a Liouville theorem for compact hypergroups.
All the above sults should translate into interesting applications to concrete examples of hypergroups . As example of such application, consider the double coset space G Cited by: 3. Hypergroups are much varied than groups. For example, if H is of prime cardinality p, there are a large number of non-isomorphic hypergroups on H, while, up to isomorphism, there is only one group Z p.
a (Nova Gorica) Hypergroups and Fuzzy sets 5 / Marty introduced hypergroups as a generalization of groups. He published some notes on hypergroups, using them in different contexts as algebraic functions, rational fractions, non commutative groups and then many researchers have been worked on this new field of.
THE MAXIMAL BOUND OF FINITE p-GROUPS WITH CERTAIN DEGREE Mehdi Alaeiyan Let G be a permutation group on a set › with no ﬂxed points in › and let m be a positive integer. Then we deﬂne the movement of G as m:= move(G):= sup¡fj¡g n¡jj¡ µ ›; g 2 Gg: If G is a p-group, p is an odd prime, such that move(G) = m, then we prove that the maximum possible size of › is less than or.
Hypergroups and their amenability notions Mahmood Alaghmandan Fields institute HypergroupsAmenable hypergroupsLeptin’s conditionsAmenability of Hypergroup algebra CONTENTS Hypergroups Amenable hypergroups Leptin’s conditions Amenability of.
theorem were given for Riesz potentials on di erent hypergroups in , , , ,  and on commutative hypergroups in , .
In this paper, we de ne generalized fractional integrals on commutative hypergroups and prove the analogue of Theorem in  for the generalized Riesz potentials on commutative hypergroups. Hypergroups and Geometric Spaces indices.
In this way, S is a closure system offor any X ⊆ G, the closure X¯ of X in G is: X = T ∈ S, T ⊆ X T If X¯ = ∅, X¯ is the least (from the set theoretical perspective) substructure containing the following closure operator is deﬁned as follows.
To see a `.pdf' version of my book Functional Analysis: Spectral Theory, click here. Literary pursuits Hypergroups and subfactors, Proc. of a symposium on Operator Theory and Functional Analysis, Cochin () (M.R. 91 m:Zbl ). (mathematics) Any algebraic group equipped with a hyperoperation.The classical moment problem is formulated for commutative hypergroups and the uniqueness is proved for polynomial hypergroups in a single variable and for Sturm--Liouville hypergroups.
Article information. Source Ann. Funct. Anal., Volume 3, Number 2 (), Dates First.In his new book, HYPERGROWTH, serial entrepeneur and Drift Founder & CEO David Cancel shares a modern approach for building products and structuring teams that makes customer communication a central priority.
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