PlanetPhysics/Theorem on CW Complex Approximation of Quantum State Spaces in QAT

\htmladdnormallink{theorem {http://planetphysics.us/encyclopedia/Formula.html} 1.}

Let ${\displaystyle [QF_{j}]_{j=1,...,n}}$ be a complete sequence of commuting quantum spin `foams' (QSFs) in an arbitrary quantum state space (QSS), and let ${\displaystyle (QF_{j},QSS_{j})}$ be the corresponding sequence of pair subspaces of QST. If ${\displaystyle Z_{j}}$ is a sequence of CW-complexes such that for any ${\displaystyle j}$ , ${\displaystyle QF_{j}\subset Z_{j}}$, then there exists a sequence of ${\displaystyle n}$-connected models ${\displaystyle (QF_{j},Z_{j})}$ of ${\displaystyle (QF_{j},QSS_{j})}$ and a sequence of induced isomorphisms ${\displaystyle {f_{*}}^{j}:\pi _{i}(Z_{j})\rightarrow \pi _{i}(QSS_{j})}$ for ${\displaystyle i>n}$, together with a sequence of induced monomorphisms for ${\displaystyle i=n}$.

There exist weak homotopy equivalences between each ${\displaystyle Z_{j}}$ and ${\displaystyle QSS_{j}}$ spaces in such a sequence. Therefore, there exists a ${\displaystyle CW}$--complex approximation of QSS defined by the sequence ${\displaystyle [Z_{j}]_{j=1,...,n}}$ of CW-complexes with dimension ${\displaystyle n\geq 2}$. This ${\displaystyle CW}$--approximation is unique up to regular homotopy equivalence.

Corollary 2.

The ${\displaystyle n}$-connected models ${\displaystyle (QF_{j},Z_{j})}$ of ${\displaystyle (QF_{j},QSS_{j})}$ form the Model category of Quantum Spin Foams ${\displaystyle (QF_{j})}$, whose \htmladdnormallink{morphisms {http://planetphysics.us/encyclopedia/TrivialGroupoid.html} are maps ${\displaystyle h_{jk}:Z_{j}\rightarrow Z_{k}}$ such that ${\displaystyle h_{jk}\mid QF_{j}=g:(QSS_{j},QF_{j})\rightarrow (QSS_{k},QF_{k})}$, and also such that the following diagram is commutative:} \\

</math> \begin{CD} Z_j @> f_j >> QSS_j \\ @V h_{jk} VV @VV g V \\ Z_k @ > f_k >> QSS_k \end{CD} Failed to parse (syntax error): {\displaystyle \\ ''Furthermore, the maps <math>h_{jk'' } are unique up to the homotopy rel ${\displaystyle QF_{j}}$ , and also rel ${\displaystyle QF_{k}}$}.

{Theorem 1} complements other data presented in the parent entry on QAT.