Journal of the Ramanujan Mathematical Society

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Some Explicit Computations and Models of Free Products


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1 The Institute of Mathematical Sciences, Taramani, Chennai 600 113, India
     

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In this note, we first work out some ‘bare hands’ computations of the most elementary possible free products involving C2 (= C ⊕ C), with the ‘uniform trace’ given by tr (z1, z2) = 1/2 (tr (z1) + tr (z2)), and M2 (= M2(C)), with the normalized trace of the matrix. Using these, we identify all free products of the form C ∗ D where {C, D} ⊂ {A1 ⊕ A2, M2(B)}, where Ai , B are finite von Neumann algebras, as is A1 ⊕ A2, with the trace tr (a1, a2) = 1/2 (tr (a1) + tr (a2)) and M2(B) (∼= M2⊗ B) with the trace tr M2 ⊗trB. Those results are then used to compute various possible free products involving certain finite dimensional von-Neumann algebras, the free-group von-Neumann algebras and the hyperfinite I I1 factor. In the process, we reprove Dykema’s result ‘R ∗ R ∼= LF2’.
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  • Some Explicit Computations and Models of Free Products

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Authors

Madhushree Basu
The Institute of Mathematical Sciences, Taramani, Chennai 600 113, India

Abstract


In this note, we first work out some ‘bare hands’ computations of the most elementary possible free products involving C2 (= C ⊕ C), with the ‘uniform trace’ given by tr (z1, z2) = 1/2 (tr (z1) + tr (z2)), and M2 (= M2(C)), with the normalized trace of the matrix. Using these, we identify all free products of the form C ∗ D where {C, D} ⊂ {A1 ⊕ A2, M2(B)}, where Ai , B are finite von Neumann algebras, as is A1 ⊕ A2, with the trace tr (a1, a2) = 1/2 (tr (a1) + tr (a2)) and M2(B) (∼= M2⊗ B) with the trace tr M2 ⊗trB. Those results are then used to compute various possible free products involving certain finite dimensional von-Neumann algebras, the free-group von-Neumann algebras and the hyperfinite I I1 factor. In the process, we reprove Dykema’s result ‘R ∗ R ∼= LF2’.