C-minimal theory
In model theory, a branch of mathematical logic, a C-minimal theory is a theory that is "minimal" with respect to a ternary relation C with certain properties. Algebraically closed fields with a (Krull) valuation are perhaps the most important example.
This notion was defined in analogy to the o-minimal theories, which are "minimal" (in the same sense) with respect to a linear order.
Definition
A C-relation is a ternary relation C(x;yz) that satisfies the following axioms.
![\forall xyz\, [ C(x;yz)\rightarrow C(x;zy) ],](../I/m/7865cf132a77da2fe6edd0f47afae5de.png)
![\forall xyz\, [ C(x;yz)\rightarrow\neg C(y;xz) ],](../I/m/33700ee111d2a51a0fb7539cb4af83e8.png)
![\forall xyzw\, [ C(x;yz)\rightarrow (C(w;yz)\vee C(x;wz)) ],](../I/m/a54da252be68dc12036cee71bdb73767.png)
![\forall xy\, [ x\neq y \rightarrow \exists z\neq y\, C(x;yz) ].](../I/m/cb58cb4d2b11c8692f94f70771d96616.png)
A C-minimal structure is a structure M, in a signature containing the symbol C, such that C satisfies the above axioms and every set of elements of M that is definable with parameters in M is a Boolean combination of instances of C, i.e. of formulas of the form C(x;bc), where b and c are elements of M.
A theory is called C-minimal if all of its models are C-minimal. A structure is called strongly C-minimal if its theory is C-minimal. One can construct C-minimal structures which are not strongly C-minimal.
Example
For a prime number p and a p-adic number a let |a|p denote its p-adic norm. Then the relation defined by 
is a C-relation, and the theory of Qp with addition and this relation is C-minimal. The theory of Qp as a field, however, is not C-minimal.
References
- Macpherson, Dugald; Steinhorn, Charles (1996), "On variants of o-minimality", Annals of Pure and Applied Logic 79 (2): 165–209, doi:10.1016/0168-0072(95)00037-2
- Haskell, Deirdre; Macpherson, Dugald (1994), "Cell decompositions of C-minimal structures", Annals of Pure and Applied Logic 66 (2): 113–162, doi:10.1016/0168-0072(94)90064-7