Multiplier Hopf group coalgebras from algebraic and analytical point of views
Abstract
The Multiplier Hopf Group Coalgebra was introduced by Hegazi in 2002 [7] as a generalization of Hope group caolgebra, introduced by Turaev in 2000 [5], in the non-unital case. We prove that the concepts introduced by A.Van Daele in constructing multiplier Hopf algebra 4 can be adapted to serve again in our construction. A multiplier Hopf group coalgebra is a family of algebras A=\Aα\α ∈ π, (π is a discrete group) equipped with a family of homomorphisms =\α,β:Aαβ M(Aα Aβ)\α,β ∈ π which is called a comultiplication under some conditions, where M(Aα Aβ) is the multiplier algebra of Aα Aβ. In 2003 A. Van Daele suggest a new approach to study the same structure by consider the direct sum of the algebras Ap's which will be a multiplier Hopf algebra called later group cograded multiplier Hope algebra 11. And hence there exist a one to one correspondence between multiplier Hopf Group Coalgebra and group cograded multiplier Hopf algebra. By using this one-one correspondence we studied multiplier Hopf Group Coalgebra \\
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