Quantum Mechanics and Operator algebras on the Hilbert ball

Mathematics – Operator Algebras

Scientific paper

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31 pages, LaTeX

Scientific paper

Cirelli, Mani\`{a} and Pizzocchero generalized quantum mechanics by K\"{a}hler geometry. Furthermore they proved that any unital C$^{*}$-algebra is represented as a function algebra on the set of pure states with a noncommutative $*$-product as an application. The ordinary quantum mechanics is regarded as a dynamical system of the projective Hilbert space ${\cal P}({\cal H})$ of a Hilbert space ${\cal H}$. The space ${\cal P}({\cal H})$ is an infinite dimensional K\"{a}hler manifold of positive constant holomorphic sectional curvature. In general, such dynamical system is constructed for a general K\"{a}hler manifold of nonzero constant holomorphic sectional curvature $c$. The Hilbert ball $B_{{\cal H}}$ is defined by the open unit ball in ${\cal H}$ and it is a K\"{a}hler manifold with $c<0$. We introduce the quantum mechanics on $B_{{\cal H}}$. As an application, we show the structure of the noncommutative function algebra on $B_{{\cal H}}$.

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