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In the mathematical field of
model theory In mathematical logic, model theory is the study of the relationship between formal theories (a collection of sentences in a formal language expressing statements about a mathematical structure), and their models (those structures in which the s ...
, the amalgamation property is a property of collections of
structures 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 ...
that guarantees, under certain conditions, that two structures in the collection can be regarded as substructures of a larger one. This property plays a crucial role in Fraïssé's theorem, which characterises classes of finite structures that arise as
age Age or AGE may refer to: Time and its effects * Age, the amount of time someone or something has been alive or has existed ** East Asian age reckoning, an Asian system of marking age starting at 1 * Ageing or aging, the process of becoming older ...
s of countable homogeneous structures. The
diagram A diagram is a symbolic representation of information using visualization techniques. Diagrams have been used since prehistoric times on walls of caves, but became more prevalent during the Enlightenment. Sometimes, the technique uses a three- ...
of the amalgamation property appears in many areas of
mathematical logic Mathematical logic is the study of logic, formal logic within mathematics. Major subareas include model theory, proof theory, set theory, and recursion theory. Research in mathematical logic commonly addresses the mathematical properties of for ...
. Examples include in
modal logic Modal logic is a collection of formal systems developed to represent statements about necessity and possibility. It plays a major role in philosophy of language, epistemology, metaphysics, and natural language semantics. Modal logics extend other ...
as an incestual accessibility relation, and in
lambda calculus Lambda calculus (also written as ''λ''-calculus) is a formal system in mathematical logic for expressing computation based on function abstraction and application using variable binding and substitution. It is a universal model of computation ...
as a manner of reduction having the Church–Rosser property.


Definition

An ''amalgam'' can be formally defined as a 5-tuple (''A,f,B,g,C'') such that ''A,B,C'' are structures having the same
signature A signature (; from la, signare, "to sign") is a handwritten (and often stylized) depiction of someone's name, nickname, or even a simple "X" or other mark that a person writes on documents as a proof of identity and intent. The writer of a ...
, and ''f: A'' → ''B, g'': ''A'' → ''C'' are ''embeddings''. Recall that ''f: A'' → ''B'' is an ''embedding'' if ''f'' is an injective morphism which induces an isomorphism from ''A'' to the substructure ''f(A)'' of ''B''. A class ''K'' of structures has the amalgamation property if for every amalgam with ''A,B,C'' ∈ ''K'' and ''A'' ≠ Ø, there exist both a structure ''D'' ∈ ''K'' and embeddings ''f':'' ''B'' → ''D, g':'' ''C'' → ''D'' such that :f'\circ f = g' \circ g. \, A first-order theory T has the amalgamation property if the class of models of T has the amalgamation property. The amalgamation property has certain connections to the
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 \ldots" can be viewed as a question "When is there an x such t ...
. In general, the amalgamation property can be considered for a category with a specified choice of the class of morphisms (in place of embeddings). This notion is related to the categorical notion of a
pullback In mathematics, a pullback is either of two different, but related processes: precomposition and fiber-product. Its dual is a pushforward. Precomposition Precomposition with a function probably provides the most elementary notion of pullback: in ...
, in particular, in connection with the strong amalgamation property (see below).Kiss, Márki, Pröhle, Tholen, Section 6


Examples

* The class of sets, where the embeddings are injective functions, and if they are assumed to be inclusions then an amalgam is simply the union of the two sets. * The class of
free group In mathematics, the free group ''F'S'' over a given set ''S'' consists of all words that can be built from members of ''S'', considering two words to be different unless their equality follows from the group axioms (e.g. ''st'' = ''suu''−1' ...
s where the embeddings are injective homomorphisms, and (assuming they are inclusions) an amalgam is the
quotient group A quotient group or factor group is a mathematical group obtained by aggregating similar elements of a larger group using an equivalence relation that preserves some of the group structure (the rest of the structure is "factored" out). For examp ...
B*C/A, where * is the
free product In mathematics, specifically group theory, the free product is an operation that takes two groups ''G'' and ''H'' and constructs a new The result contains both ''G'' and ''H'' as subgroups, is generated by the elements of these subgroups, and i ...
. * The class of finite
linear order In mathematics, a total 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 ( reflexive ...
ings. A similar but different notion to the amalgamation property is the
joint embedding property In universal algebra and model theory, a class of structures ''K'' is said to have the joint embedding property if for all structures ''A'' and ''B'' in ''K'', there is a structure ''C'' in ''K'' such that both ''A'' and ''B'' have embeddings into ...
. To see the difference, first consider the class ''K'' (or simply the set) containing three models with linear orders, ''L''1 of size one, ''L''2 of size two, and ''L''3 of size three. This class ''K'' has the joint embedding property because all three models can be embedded into ''L''3. However, ''K'' does not have the amalgamation property. The counterexample for this starts with ''L''1 containing a single element ''e'' and extends in two different ways to ''L''3, one in which ''e'' is the smallest and the other in which ''e'' is the largest. Now any common model with an embedding from these two extensions must be at least of size five so that there are two elements on either side of ''e''. Now consider the class of
algebraically closed field In mathematics, a field is algebraically closed if every non-constant polynomial in (the univariate polynomial ring with coefficients in ) has a root in . Examples As an example, the field of real numbers is not algebraically closed, because ...
s. This class has the amalgamation property since any two field extensions of a prime field can be embedded into a common field. However, two arbitrary fields cannot be embedded into a common field when the characteristic of the fields differ.


Strong amalgamation property

A class ''K'' of structures has the ''strong amalgamation property'' (SAP), also called the ''disjoint amalgamation property'' (DAP), if for every amalgam with ''A,B,C'' ∈ ''K'' there exist both a structure ''D'' ∈ ''K'' and embeddings ''f':'' ''B'' → ''D, g': C'' → ''D'' such that :f' \circ f = g' \circ g \, ::and :f ' \cap g ' = (f ' \circ f) = (g ' \circ g) \, ::where for any set ''X'' and function ''h'' on ''X,'' :h \lbrack X \rbrack = \lbrace h(x) \mid x \in X \rbrace. \,


See also

*
Span (category theory) In category theory, a span, roof or correspondence is a generalization of the notion of relation between two objects of a category. When the category has all pullbacks (and satisfies a small number of other conditions), spans can be considered ...
*
Pushout (category theory) In category theory, a branch of mathematics, a pushout (also called a fibered coproduct or fibered sum or cocartesian square or amalgamated sum) is the colimit of a diagram consisting of two morphisms ''f'' : ''Z'' → ''X'' and ''g'' : ''Z'' &r ...
*
Joint embedding property In universal algebra and model theory, a class of structures ''K'' is said to have the joint embedding property if for all structures ''A'' and ''B'' in ''K'', there is a structure ''C'' in ''K'' such that both ''A'' and ''B'' have embeddings into ...
* Fraïssé's theorem


References


References

* * Entries o
amalgamation property
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strong amalgamation property
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online database of classes of algebraic structures
(Department of Mathematics and Computer Science, Chapman University). * E.W. Kiss, L. Márki, P. Pröhle, W. Tholen, ''Categorical algebraic properties. A compendium on amalgamation, congruence extension, epimorphisms, residual smallness, and injectivity'', Studia Sci. Math. Hungar 18 (1), 79-141, 198
whole journal issue
{{Mathematical logic Model theory