mathematical logic Mathematical logic is the study of Logic#Formal logic, formal logic within mathematics. Major subareas include model theory, proof theory, set theory, and recursion theory (also known as computability theory). Research in mathematical logic com ...

, and more specifically in

model theory In mathematical logic, model theory is the study of the relationship between theory (mathematical logic), formal theories (a collection of Sentence (mathematical logic), sentences in a formal language expressing statements about a Structure (mat ...

, an infinite

structure A structure is an arrangement and organization of interrelated elements in a material object or system, or the object or system so organized. Material structures include man-made objects such as buildings and machines and natural objects such as ...

(''M'',<,...) that is

totally ordered In mathematics, a total order or linear order is a partial order in which any two elements are comparable. That is, a total order is a binary relation \leq on some set X, which satisfies the following for all a, b and c in X: # a \leq a ( r ...

by < is called an o-minimal structure if and only if every definable subset ''X'' ⊆ ''M'' (with parameters taken from ''M'') is a finite union of intervals and points. O-minimality can be regarded as a weak form of

quantifier elimination Quantifier elimination is a concept of simplification used in mathematical logic, model theory, and theoretical computer science. Informally, a quantified statement "\exists x such that ..." can be viewed as a question "When is there an x such ...

. A structure ''M'' is o-minimal if and only if every

formula In science, a formula is a concise way of expressing information symbolically, as in a mathematical formula or a ''chemical formula''. The informal use of the term ''formula'' in science refers to the general construct of a relationship betwe ...

with one

free variable In mathematics, and in other disciplines involving formal languages, including mathematical logic and computer science, a variable may be said to be either free or bound. Some older books use the terms real variable and apparent variable for f ...

and parameters in ''M'' is equivalent to a quantifier-free formula involving only the ordering, also with parameters in ''M''. This is analogous to the minimal structures, which are exactly the analogous property down to equality. A

theory A theory is a systematic and rational form of abstract thinking about a phenomenon, or the conclusions derived from such thinking. It involves contemplative and logical reasoning, often supported by processes such as observation, experimentation, ...

''T'' is an o-minimal theory if every

model A model is an informative representation of an object, person, or system. The term originally denoted the plans of a building in late 16th-century English, and derived via French and Italian ultimately from Latin , . Models can be divided in ...

of ''T'' is o-minimal. It is known that the complete theory ''T'' of an o-minimal structure is an o-minimal theory. This result is remarkable because, in contrast, the

complete theory In mathematical logic, a theory is complete if it is consistent and for every closed formula in the theory's language, either that formula or its negation is provable. That is, for every sentence \varphi, the theory T contains the sentence or i ...

of a minimal structure need not be a

strongly minimal theory In model theory—a branch of mathematical logic—a minimal structure is an infinite one-sorted structure such that every subset of its domain that is definable with parameters is either finite or cofinite. A strongly minimal theory is ...

, that is, there may be an elementarily equivalent structure that is not minimal.

Set-theoretic definition

O-minimal structures can be defined without recourse to model theory. Here we define a structure on a nonempty set ''M'' in a set-theoretic manner, as a sequence ''S'' = (''S''_''n''), ''n'' = 0,1,2,... such that # ''S''_''n'' is a

boolean algebra In mathematics and mathematical logic, Boolean algebra is a branch of algebra. It differs from elementary algebra in two ways. First, the values of the variable (mathematics), variables are the truth values ''true'' and ''false'', usually denot ...

of subsets of ''M''^''n'' # if ''D'' ∈ ''S''_''n'' then ''M'' × ''D'' and ''D'' ×''M'' are in ''S''_''n''+1 # the set is in ''S''_''n'' # if ''D'' ∈ ''S''_''n''+1 and ''π'' : ''M''^''n''+1 → ''M''^''n'' is the projection map on the first ''n'' coordinates, then ''π''(''D'') ∈ ''S''_''n''. For a subset ''A'' of ''M'', we consider the smallest structure ''S''(''A'') containing ''S'' such that every finite subset of ''A'' is contained in ''S''₁. A subset ''D'' of ''M''^''n'' is called ''A''-definable if it is contained in ''S''_''n''(''A''); in that case ''A'' is called a set of parameters for ''D''. A subset is called definable if it is ''A''-definable for some ''A''. If ''M'' has a dense linear order without endpoints on it, say <, then a structure ''S'' on ''M'' is called o-minimal (respect to <) if it satisfies the extra axioms

the set < (=) is in ''S''₂
the definable subsets of ''M'' are precisely the finite unions of intervals and points.

The "o" stands for "order", since any o-minimal structure requires an ordering on the underlying set.

Model theoretic definition

O-minimal structures originated in model theory and so have a simpler — but equivalent — definition using the language of model theory. Specifically if ''L'' is a language including a binary relation <, and (''M'',<,...) is an ''L''-structure where < is interpreted to satisfy the axioms of a dense linear order, then (''M'',<,...) is called an o-minimal structure if for any definable set ''X'' ⊆ ''M'' there are finitely many open intervals ''I''₁,..., ''I''_''r'' in ''M'' ∪ and a finite set ''X''₀ such that :

X=X_0\cup I_1\cup\ldots\cup I_r.

Examples

Examples of o-minimal theories are: * The complete theory of dense linear orders in the language with just the ordering. * RCF, the

real closed field In mathematics, a real closed field is a field F that has the same first-order properties as the field of real numbers. Some examples are the field of real numbers, the field of real algebraic numbers, and the field of hyperreal numbers. Def ...

s. * The complete theory of the real field with restricted

analytic function In mathematics, an analytic function is a function that is locally given by a convergent power series. There exist both real analytic functions and complex analytic functions. Functions of each type are infinitely differentiable, but complex ...

s added (i.e. analytic functions on a neighborhood of ,1sup>''n'', restricted to ,1sup>''n''; note that the unrestricted sine function has infinitely many roots, and so cannot be definable in an o-minimal structure.) * The complete theory of the real field with a symbol for the exponential function by

Wilkie's theorem In mathematics, Wilkie's theorem is a result by Alex Wilkie about the theory of ordered fields with an exponential function, or equivalently about the geometric nature of exponential varieties. Formulations In terms of model theory, Wilkie's the ...

. More generally, the complete theory of the real numbers with

Pfaffian function In mathematics, Pfaffian functions are a certain class of functions whose derivative can be written in terms of the original function. They were originally introduced by Askold Khovanskii in the 1970s, but are named after German mathematician J ...

s added. * The last two examples can be combined: given any o-minimal expansion of the real field (such as the real field with restricted analytic functions), one can define its Pfaffian closure, which is again an o-minimal structure. (The Pfaffian closure of a structure is, in particular, closed under Pfaffian chains where arbitrary definable functions are used in place of polynomials.) In the case of RCF, the definable sets are the

semialgebraic set In mathematics, a basic semialgebraic set is a set defined by polynomial equalities and polynomial inequalities, and a semialgebraic set is a finite union of basic semialgebraic sets. A semialgebraic function is a function with a semialgebraic gr ...

s. Thus the study of o-minimal structures and theories generalises

real algebraic geometry In mathematics, real algebraic geometry is the sub-branch of algebraic geometry studying real algebraic sets, i.e. real-number solutions to algebraic equations with real-number coefficients, and mappings between them (in particular real polynomi ...

. A major line of current research is based on discovering expansions of the real ordered field that are o-minimal. Despite the generality of application, one can show a great deal about the geometry of set definable in o-minimal structures. There is a cell decomposition theorem, Whitney and Verdier stratification theorems and a good notion of dimension and Euler characteristic. Moreover, continuously differentiable definable functions in a o-minimal structure satisfy a generalization of Łojasiewicz inequality, a property that has been used to guarantee the convergence of some non-smooth optimization methods, such as the stochastic subgradient method (under some mild assumptions).

Notes

References

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External links