For a commutative ring R with unit we investigate the embedding of tensor
product algebras into the Leavitt algebra L2,R. We show that the tensor
product L2,Z⊗L2,Z does not embed in
L2,Z (as a unital ∗-algebra). We also prove a partial
non-embedding result for the more general L2,R⊗L2,R. Our
techniques rely on realising Thompson's group V as a subgroup of the unitary
group of L2,R.Comment: 16 pages. At the request of a referee the paper arXiv:1503.08705v2
was split into two papers. This is the second of those paper