ORCID Profile
0000-0003-0831-1842
Current Organisations
School Curriculum and Standards Authority
,
Murdoch University
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Publisher: Elsevier BV
Date: 1995
Publisher: Cambridge University Press (CUP)
Date: 08-1988
DOI: 10.1017/S1446788700032237
Abstract: Let G be any compact group, connected or disconnected, with dual object Ĝ . We define a family of local Sidon subsets of Ĝ in terms of allowable images of the representations. Using this family we develop a straightforward criterion whereby the existence of infinite Sidon subsets of Ĝ may be decided.
Publisher: Springer Science and Business Media LLC
Date: 03-1989
DOI: 10.1007/BF01442671
Publisher: Cambridge University Press (CUP)
Date: 11-1993
DOI: 10.1017/S030500410007167X
Abstract: We show that all partial sums of 1 + σ k −α cos k θ are non-negative for α α 0 , where 0·308443 α 0 0·308444 and α 0 is the unique root of the equation
Publisher: American Mathematical Society (AMS)
Date: 1993
DOI: 10.1090/S0002-9947-1993-1157613-2
Abstract: We classify the compact, connected groups which have infinite central Λ ( p ) \\Lambda (p) sets, arithmetically characterize central Λ ( p ) \\Lambda (p) sets on certain product groups, and give ex les of Λ ( p ) \\Lambda (p) sets which are non-Sidon and have unbounded degree. These sets are intimately connected with Figà-Talamanca and Rider’s ex les of Sidon sets, and stem from the existence of families of tensor product representations of almost simple Lie groups whose decompositions into irreducibles are rank-independent.
Publisher: Elsevier BV
Date: 12-1991
Publisher: Springer Science and Business Media LLC
Date: 03-1986
DOI: 10.1007/BF01326848
No related grants have been discovered for David Wilson.