The mathematical structure of quantum real numbers

Abstract

The mathematical structure of the sheaf of Dedekind real numbers (X) for a quantum system is discussed. The algebra of physical qualities is represented by an O* algebra M that acts on a Hilbert space that carries an irreducible representation of the symmetry group of the system. X =( M), the state space for M, has the weak topology generated by the functions aQ(·), defined for A ∈ Msa and ∀ ∈ ( M) , by aQ( ) = Tr A . For any open subset W of ( M), the function aQ|W is the numerical value of the quality A defined to the extent W. The example of the quantum real numbers for a single Galilean relativistic particle is given.