Many algebras arising in logic have a lattice structure with intervals being equipped with antitone involutions. It has been proved in [CHK1] that these lattices are in a one-to-one correspondence with so-called basic algebras. In the recent papers [BOTUR, M.a€”HALA??, R.: Finite commutative basic algebras are MV-algebras, J. Mult.-Valued Logic Soft Comput. (To appear)]. and [BOTUR, M.a€”HALA??, R.: Complete commutative basic algebras, Order 24 (2007), 89a€“105] we have proved that every finite commutative basic algebra is an MV-algebra, and that every complete commutative basic algebra is a subdirect product of chains. The paper solves in negative the open question posed in [BOTUR, M.a€”HALA??, R.: Complete commutative basic algebras, Order 24 (2007), 89a€“105] whether every commutative basic algebra on the interval [0, 1] of the reals has to be an MV-algebra.
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