Equivariant K-theory

In model theory, a branch of mathematical logic, the Hrushovski construction generalizes the Fraïssé limit by working with a notion of strong substructure ${\displaystyle \leq }$ rather than ${\displaystyle \subseteq }$. It can be thought of as a kind of "model-theoretic forcing", where a (usually) stable structure is created, called the generic. The specifics of ${\displaystyle \leq }$ determine various properties of the generic, with its geometric properties being of particular interest. It was initially used by Ehud Hrushovski to generate a stable structure with an "exotic" geometry, thereby refuting Zil'ber's Conjecture.

Three conjectures

The initial applications of the Hrushovski construction refuted two conjectures and answered a third question in the negative. Specifically, we have:

• Lachlan's Conjecture Any stable ${\displaystyle \aleph _{0}}$-categorical theory is totally transcendental.

• Zil'ber's Conjecture Any uncountably categorical theory is either locally modular or interprets an algebraically closed field.

• Cherlin's Question Is there a maximal (with respect to expansions) strongly minimal set?

The construction

Let L be a finite relational language. Fix C a class of finite L-structures which are closed under isomorphisms and substructures. We want to strengthen the notion of substructure; let ${\displaystyle \leq }$ be a relation on pairs from C satisfying:

• ${\displaystyle A\leq B}$ implies ${\displaystyle A\subseteq B}$.
• ${\displaystyle A\subseteq B\subseteq C}$ and ${\displaystyle A\leq C}$ implies ${\displaystyle A\leq B}$
• ${\displaystyle \varnothing \leq A}$ for all ${\displaystyle A\in \mathbb {C} }$.
• ${\displaystyle A\leq B}$ implies ${\displaystyle A\cap C\leq B\cap C}$ for all ${\displaystyle C\in \mathbb {C} }$.
• If ${\displaystyle f:A\rightarrow A'}$ is an isomorphism and ${\displaystyle A\leq B}$, then ${\displaystyle f}$ extends to an isomorphism ${\displaystyle B\rightarrow B'}$ for some superset of ${\displaystyle B}$ with ${\displaystyle A'\leq B'}$.

An embedding ${\displaystyle f:A\hookrightarrow D}$ is strong if ${\displaystyle f(A)\leq D}$.

We also want the pair (C, ${\displaystyle \leq }$) to satisfy the amalgamation property: if ${\displaystyle A\leq B_{1},A\leq B_{2}}$ then there is a ${\displaystyle D\in \mathbb {C} }$ so that each ${\displaystyle B_{i}}$ embeds strongly into ${\displaystyle D}$ with the same image for ${\displaystyle A}$.

For infinite ${\displaystyle D}$, and ${\displaystyle A\in \mathbb {C} }$, we say ${\displaystyle A\leq D}$ iff ${\displaystyle A\leq X}$ for ${\displaystyle A\subseteq X\subseteq D}$, ${\displaystyle X\in \mathbb {C} }$. For any ${\displaystyle A\subseteq D}$, the closure of ${\displaystyle A}$ (in ${\displaystyle D}$), ${\displaystyle \operatorname {cl} _{D}(A)}$ is the smallest superset of ${\displaystyle A}$ satisfying ${\displaystyle \operatorname {cl} (A)\leq D}$.

Definition A countable structure ${\displaystyle G}$ is a (C, ${\displaystyle \leq }$)-generic if:

• For ${\displaystyle A\subseteq _{\omega }G}$, ${\displaystyle A\in \mathbb {C} }$.
• For ${\displaystyle A\leq G}$, if ${\displaystyle A\leq B}$ then ${\displaystyle B}$ there is a strong embedding of ${\displaystyle B}$ into ${\displaystyle G}$ over ${\displaystyle A}$
• ${\displaystyle G}$ has finite closures: for every ${\displaystyle A\subseteq _{\omega }G}$, ${\displaystyle \operatorname {cl} _{G}(A)}$ is finite.

Theorem If (C, ${\displaystyle \leq }$) has the amalgamation property, then there is a unique (C, ${\displaystyle \leq }$)-generic.

The existence proof proceeds in imitation of the existence proof for Fraïssé limits. The uniqueness proof comes from an easy back and forth argument.

References

• E. Hrushovski. A stable ${\displaystyle \aleph _{0}}$-categorical pseudoplane. Preprint, 1988
• E. Hrushovski. A new strongly minimal set. Annals of Pure and Applied Logic, 52:147–166, 1993.
• Slides on Hrushovski construction from Frank Wagner