Direct finiteness of representable regular rings with involution: A counterexample
Abstract
Bruns and Roddy constructed a 3-generated modular ortholattice L which cannot be embedded into any complete modular ortholattice. Motivated by their approach, we use shift operators to construct a *-regular *-ring R of endomorphisms of an inner product space (which can be chosen as the Hilbert space 2) such that direct finiteness fails for R.
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