Archimedean property: Difference between revisions
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{{Short description|Mathematical property of algebraic structures}} |
{{Short description|Mathematical property of algebraic structures}} |
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{{about|abstract algebra|the physical law|Archimedes' principle}} |
{{about|abstract algebra|the physical law|Archimedes' principle}} |
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{{Use dmy dates|date=September 2023}} |
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[[File:01 Archimedisches Axiom.svg|thumb|250px|Illustration of the Archimedean property.]] |
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In [[abstract algebra]] and [[mathematical analysis|analysis]], the '''Archimedean property''', named after the ancient Greek mathematician [[Archimedes]] of [[Syracuse, Italy|Syracuse]], is a property held by some [[algebraic structure]]s, such as ordered or normed [[group (algebra)|groups]], and [[field (mathematics)|fields]]. |
In [[abstract algebra]] and [[mathematical analysis|analysis]], the '''Archimedean property''', named after the ancient Greek mathematician [[Archimedes]] of [[Syracuse, Italy|Syracuse]], is a property held by some [[algebraic structure]]s, such as ordered or normed [[group (algebra)|groups]], and [[field (mathematics)|fields]]. |
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The property, typically construed, states that given two positive numbers |
The property, as typically construed, states that given two positive numbers <math>x</math> and <math>y</math>, there is an integer <math>n</math> such that <math>nx > y</math>. It also means that the set of [[natural numbers]] is not bounded above.<ref>{{cite web|url=https://www.math.cuhk.edu.hk/course_builder/2021/math2050c/MATH%202050C%20Lecture%204%20(Jan%2021).pdf|title=Math 2050C Lecture|website=cuhk.edu.hk|access-date=3 September 2023}}</ref> Roughly speaking, it is the property of having no ''infinitely large'' or ''infinitely small'' elements. It was [[Otto Stolz]] who gave the axiom of Archimedes its name because it appears as Axiom V of Archimedes’ ''[[On the Sphere and Cylinder]]''.<ref>G. Fisher (1994) in P. Ehrlich(ed.), Real Numbers, Generalizations of the Reals, and Theories of continua, 107–145, Kluwer Academic</ref> |
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It was [[Otto Stolz]] who gave the axiom of Archimedes its name because it appears as Axiom V of Archimedes’ ''[[On the Sphere and Cylinder]]''.<ref>G. Fisher (1994) in P. Ehrlich(ed.), Real Numbers, Generalizations of the Reals, and Theories of continua, 107-145, Kluwer Academic</ref> |
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The notion arose from the theory of [[magnitude (mathematics)|magnitudes]] of |
The notion arose from the theory of [[magnitude (mathematics)|magnitudes]] of ancient Greece; it still plays an important role in modern mathematics such as [[David Hilbert]]'s [[Hilbert's axioms|axioms for geometry]], and the theories of [[linearly ordered group|ordered groups]], [[ordered field]]s, and [[local fields]]. |
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An algebraic structure in which any two non-zero elements are ''comparable'', in the sense that neither of them is [[infinitesimal]] with respect to the other, is said to be '''Archimedean'''. |
An algebraic structure in which any two non-zero elements are ''comparable'', in the sense that neither of them is [[infinitesimal]] with respect to the other, is said to be '''Archimedean'''. |
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Let {{mvar|x}} and {{mvar|y}} be [[Linearly ordered group#Definitions|positive elements]] of a [[linearly ordered group]] ''G''. |
Let {{mvar|x}} and {{mvar|y}} be [[Linearly ordered group#Definitions|positive elements]] of a [[linearly ordered group]] ''G''. |
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Then ''' |
Then <math>x</math> '''is infinitesimal with respect to''' <math>y</math> (or equivalently, <math>y</math> '''is infinite with respect to''' <math>x</math>) if, for any [[natural number]] <math>n</math>, the multiple <math>nx</math> is less than <math>y</math>, that is, the following inequality holds: |
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<math display="block"> \underbrace{x+\cdots+x}_{n\text{ terms}} < y. \, </math> |
<math display="block"> \underbrace{x+\cdots+x}_{n\text{ terms}} < y. \, </math> |
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This definition can be extended to the entire group by taking absolute values. |
This definition can be extended to the entire group by taking absolute values. |
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The group |
The group <math>G</math> is '''Archimedean''' if there is no pair <math>(x,y)</math> such that <math>x</math> is infinitesimal with respect to <math>y</math>. |
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Additionally, if |
Additionally, if <math>K</math> is an [[algebraic structure]] with a unit (1) — for example, a [[ring (mathematics)|ring]] — a similar definition applies to <math>K</math>. |
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If |
If <math>x</math> is infinitesimal with respect to <math>1</math>, then <math>x</math> is an '''infinitesimal element'''. |
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Likewise, if |
Likewise, if <math>y</math> is infinite with respect to <math>1</math>, then <math>y</math> is an '''infinite element'''. |
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The algebraic structure |
The algebraic structure <math>K</math> is Archimedean if it has no infinite elements and no infinitesimal elements. |
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=== Ordered fields === |
=== Ordered fields === |
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[[Ordered field]]s have some additional properties: |
[[Ordered field]]s have some additional properties: |
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* The rational numbers are [[Embedding|embedded]] in any ordered field. That is, any ordered field has [[Characteristic (algebra)|characteristic]] zero. |
* The rational numbers are [[Embedding|embedded]] in any ordered field. That is, any ordered field has [[Characteristic (algebra)|characteristic]] zero. |
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* If |
* If <math>x</math> is infinitesimal, then <math>1/x</math> is infinite, and vice versa. Therefore, to verify that a field is Archimedean it is enough to check only that there are no infinitesimal elements, or to check that there are no infinite elements. |
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* If |
* If <math>x</math> is infinitesimal and <math>r</math> is a rational number, then <math>rx</math> is also infinitesimal. As a result, given a general element <math>c</math>, the three numbers <math>c/2</math>, <math>c</math>, and <math>2c</math> are either all infinitesimal or all non-infinitesimal. |
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In this setting, an ordered field {{mvar|K}} is Archimedean precisely when the following statement, called the '''axiom of Archimedes''', holds: |
In this setting, an ordered field {{mvar|K}} is Archimedean precisely when the following statement, called the '''axiom of Archimedes''', holds: |
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: "Let |
: "Let <math>x</math> be any element of <math>K</math>. Then there exists a natural number <math>n</math> such that <math>n > x</math>." |
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Alternatively one can use the following characterization: |
Alternatively one can use the following characterization: |
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<math display="block">\forall\, \varepsilon \in K\big(\varepsilon > 0 \implies \exists\ n \in N : 1/n < \varepsilon\big).</math> |
<math display="block">\forall\, \varepsilon \in K\big(\varepsilon > 0 \implies \exists\ n \in N : 1/n < \varepsilon\big).</math> |
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The qualifier "Archimedean" is also formulated in the theory of [[Valuation ring|rank one valued fields]] and normed spaces over rank one valued fields as follows. |
The qualifier "Archimedean" is also formulated in the theory of [[Valuation ring|rank one valued fields]] and normed spaces over rank one valued fields as follows. |
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Let |
Let <math>K</math> be a field endowed with an absolute value function, i.e., a function which associates the real number <math>0</math> with the field element 0 and associates a positive real number <math>|x|</math> with each non-zero <math>x \in K</math> and satisfies |
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<math>|xy|=|x| |y|</math> and <math>|x+y| \le |x|+|y|</math>. |
<math>|xy|=|x| |y|</math> and <math>|x+y| \le |x|+|y|</math>. |
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Then, |
Then, <math>K</math> is said to be '''Archimedean''' if for any non-zero <math>x \in K</math> there exists a [[natural number]] <math>n</math> such that |
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<math display="block">|\underbrace{x+\cdots+x}_{n\text{ terms}}| > 1. </math> |
<math display="block">|\underbrace{x+\cdots+x}_{n\text{ terms}}| > 1. </math> |
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Similarly, a normed space is Archimedean if a sum of |
Similarly, a normed space is Archimedean if a sum of <math>n</math> terms, each equal to a non-zero vector <math>x</math>, has norm greater than one for sufficiently large <math>n</math>. |
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A field with an absolute value or a normed space is either Archimedean or satisfies the stronger condition, referred to as the [[ultrametric]] [[triangle inequality]], |
A field with an absolute value or a normed space is either Archimedean or satisfies the stronger condition, referred to as the [[ultrametric]] [[triangle inequality]], |
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<math display="block">|x+y| \le \max(|x|,|y|) ,</math> |
<math display="block">|x+y| \le \max(|x|,|y|) ,</math> |
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=== Archimedean property of the real numbers === |
=== Archimedean property of the real numbers === |
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The field of the rational numbers can be assigned one of a number of absolute value functions, including the trivial function <math>|x|=1 |
The field of the rational numbers can be assigned one of a number of absolute value functions, including the trivial function <math>|x|=1</math>, when <math>x \neq 0</math>, the more usual <math display="inline">|x| = \sqrt{x^2}</math>, and the <math>p</math>'''-adic absolute value''' functions. |
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By [[Ostrowski's theorem]], every non-trivial absolute value on the rational numbers is equivalent to either the usual absolute value or some |
By [[Ostrowski's theorem]], every non-trivial absolute value on the rational numbers is equivalent to either the usual absolute value or some <math>p</math>-adic absolute value. |
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The rational field is not complete with respect to non-trivial absolute values; with respect to the trivial absolute value, the rational field is a discrete topological space, so complete. |
The rational field is not complete with respect to non-trivial absolute values; with respect to the trivial absolute value, the rational field is a discrete topological space, so complete. |
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The completion with respect to the usual absolute value (from the order) is the field of real numbers. |
The completion with respect to the usual absolute value (from the order) is the field of real numbers. |
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By this construction the field of real numbers is Archimedean both as an ordered field and as a normed field.<ref>[[Neal Koblitz]], "p-adic Numbers, p-adic Analysis, and Zeta-Functions", Springer-Verlag,1977.</ref> |
By this construction the field of real numbers is Archimedean both as an ordered field and as a normed field.<ref>[[Neal Koblitz]], "p-adic Numbers, p-adic Analysis, and Zeta-Functions", Springer-Verlag,1977.</ref> |
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On the other hand, the completions with respect to the other non-trivial absolute values give the fields of [[ |
On the other hand, the completions with respect to the other non-trivial absolute values give the fields of [[p-adic number]]s, where <math>p</math> is a prime integer number (see below); since the <math>p</math>-adic absolute values satisfy the [[ultrametric]] property, then the <math>p</math>-adic number fields are non-Archimedean as normed fields (they cannot be made into ordered fields). |
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<!-- "by axiom" side -->In the [[axiomatic theory of real numbers]], the non-existence of nonzero infinitesimal real numbers is implied by the [[least upper bound property]] as follows. |
<!-- "by axiom" side -->In the [[axiomatic theory of real numbers]], the non-existence of nonzero infinitesimal real numbers is implied by the [[least upper bound property]] as follows. |
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Denote by |
Denote by <math>Z</math> the set consisting of all positive infinitesimals. |
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This set is bounded above by 1. |
This set is bounded above by <math>1</math>. |
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Now [[proof by contradiction|assume for a contradiction]] that |
Now [[proof by contradiction|assume for a contradiction]] that <math>Z</math> is nonempty. |
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Then it has a [[least upper bound]] |
Then it has a [[least upper bound]] <math>c</math>, which is also positive, so <math>c/2 < c < 2c</math>. |
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Since {{mvar|c}} is an [[upper bound]] of |
Since {{mvar|c}} is an [[upper bound]] of <math>Z</math> and <math>2c</math> is strictly larger than <math>c</math>, <math>2c</math> is not a positive infinitesimal. |
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That is, there is some natural number |
That is, there is some natural number <math>n</math> for which <math>1/n < 2c</math>. |
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On the other hand, |
On the other hand, <math>c/2</math> is a positive infinitesimal, since by the definition of least upper bound there must be an infinitesimal <math>x</math> between <math>c/2</math> and <math>c</math>, and if <math>1/k < c/2 \leq x</math> then <math>x</math> is not infinitesimal. |
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But |
But <math>1/(4n) < c/2</math>, so <math>c/2</math> is not infinitesimal, and this is a contradiction. |
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This means that |
This means that <math>Z</math> is empty after all: there are no positive, infinitesimal real numbers. |
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The Archimedean property of real numbers holds also in [[constructive analysis]], even though the least upper bound property may fail in that context. |
The Archimedean property of real numbers holds also in [[constructive analysis]], even though the least upper bound property may fail in that context. |
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(A rational function is any function that can be expressed as one [[polynomial]] divided by another polynomial; we will assume in what follows that this has been done in such a way that the [[leading coefficient]] of the denominator is positive.) |
(A rational function is any function that can be expressed as one [[polynomial]] divided by another polynomial; we will assume in what follows that this has been done in such a way that the [[leading coefficient]] of the denominator is positive.) |
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To make this an ordered field, one must assign an ordering compatible with the addition and multiplication operations. |
To make this an ordered field, one must assign an ordering compatible with the addition and multiplication operations. |
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Now |
Now <math>f > g</math> if and only if <math>f - g > 0</math>, so we only have to say which rational functions are considered positive. |
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Call the function positive if the leading coefficient of the numerator is positive. (One must check that this ordering is well defined and compatible with addition and multiplication.) |
Call the function positive if the leading coefficient of the numerator is positive. (One must check that this ordering is well defined and compatible with addition and multiplication.) |
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By this definition, the rational function 1/ |
By this definition, the rational function <math>1/x</math> is positive but less than the rational function <math>1</math>. |
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In fact, if |
In fact, if <math>n</math> is any natural number, then <math>n(1/x) = n/x</math> is positive but still less than <math>1</math>, no matter how big <math>n</math> is. |
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Therefore, 1/ |
Therefore, <math>1/x</math> is an infinitesimal in this field. |
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This example generalizes to other coefficients. |
This example generalizes to other coefficients. |
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Taking rational functions with rational instead of real coefficients produces a countable non-Archimedean ordered field. |
Taking rational functions with rational instead of real coefficients produces a countable non-Archimedean ordered field. |
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Taking the coefficients to be the rational functions in a different variable, say |
Taking the coefficients to be the rational functions in a different variable, say <math>y</math>, produces an example with a different [[order type]]. |
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=== Non-Archimedean valued fields === |
=== Non-Archimedean valued fields === |
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=== Equivalent definitions of Archimedean ordered field === |
=== Equivalent definitions of Archimedean ordered field === |
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Every linearly ordered field |
Every linearly ordered field <math>K</math> contains (an isomorphic copy of) the rationals as an ordered subfield, namely the subfield generated by the multiplicative unit <math>1</math> of <math>K</math>, which in turn contains the integers as an ordered subgroup, which contains the natural numbers as an ordered [[monoid]]<!-- semigroup -->. |
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The embedding of the rationals then gives a way of speaking about the rationals, integers, and natural numbers in |
The embedding of the rationals then gives a way of speaking about the rationals, integers, and natural numbers in <math>K</math>. |
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The following are equivalent characterizations of Archimedean fields in terms of these substructures.<ref name="Schechter">{{harvnb|Schechter|1997|loc=§10.3}}</ref> |
The following are equivalent characterizations of Archimedean fields in terms of these substructures.<ref name="Schechter">{{harvnb|Schechter|1997|loc=§10.3}}</ref> |
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# The natural numbers are [[cofinal (mathematics)|cofinal]] in |
# The natural numbers are [[cofinal (mathematics)|cofinal]] in <math>K</math>. That is, every element of <math>K</math> is less than some natural number. (This is not the case when there exist infinite elements.) Thus an Archimedean field is one whose natural numbers grow without bound. |
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# Zero is the [[infimum]] in |
# Zero is the [[infimum]] in <math>K</math> of the set <math>\{1/2, 1/3, 1/4, \dots\}</math>. (If <math>K</math> contained a positive infinitesimal it would be a lower bound for the set whence zero would not be the greatest lower bound.) |
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# The set of elements of |
# The set of elements of <math>K</math> between the positive and negative rationals is non-open. This is because the set consists of all the infinitesimals, which is just the set <math>\{0\}</math> when there are no nonzero infinitesimals, and otherwise is open, there being neither a least nor greatest nonzero infinitesimal. Observe that in both cases, the set of infinitesimals is closed. In the latter case, (i) every infinitesimal is less than every positive rational, (ii) there is neither a greatest infinitesimal nor a least positive rational, and (iii) there is nothing else in between. Consequently, any non-Archimedean ordered field is both incomplete and disconnected. |
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# For any |
# For any <math>x</math> in <math>K</math> the set of integers greater than <math>x</math> has a least element. (If <math>x</math> were a negative infinite quantity every integer would be greater than it.) |
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# Every nonempty open interval of |
# Every nonempty open interval of <math>K</math> contains a rational. (If <math>x</math> is a positive infinitesimal, the open interval <math>(x,2x)</math> contains infinitely many infinitesimals but not a single rational.) |
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# The rationals are [[Dense set|dense]] in |
# The rationals are [[Dense set|dense]] in <math>K</math> with respect to both sup and inf. (That is, every element of <math>K</math> is the sup of some set of rationals, and the inf of some other set of rationals.) Thus an Archimedean field is any dense ordered extension of the rationals, in the sense of any ordered field that densely embeds its rational elements. |
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== See also == |
== See also == |
Latest revision as of 09:54, 14 December 2024
In abstract algebra and analysis, the Archimedean property, named after the ancient Greek mathematician Archimedes of Syracuse, is a property held by some algebraic structures, such as ordered or normed groups, and fields. The property, as typically construed, states that given two positive numbers and , there is an integer such that . It also means that the set of natural numbers is not bounded above.[1] Roughly speaking, it is the property of having no infinitely large or infinitely small elements. It was Otto Stolz who gave the axiom of Archimedes its name because it appears as Axiom V of Archimedes’ On the Sphere and Cylinder.[2]
The notion arose from the theory of magnitudes of ancient Greece; it still plays an important role in modern mathematics such as David Hilbert's axioms for geometry, and the theories of ordered groups, ordered fields, and local fields.
An algebraic structure in which any two non-zero elements are comparable, in the sense that neither of them is infinitesimal with respect to the other, is said to be Archimedean. A structure which has a pair of non-zero elements, one of which is infinitesimal with respect to the other, is said to be non-Archimedean. For example, a linearly ordered group that is Archimedean is an Archimedean group.
This can be made precise in various contexts with slightly different formulations. For example, in the context of ordered fields, one has the axiom of Archimedes which formulates this property, where the field of real numbers is Archimedean, but that of rational functions in real coefficients is not.
History and origin of the name of the Archimedean property
[edit]The concept was named by Otto Stolz (in the 1880s) after the ancient Greek geometer and physicist Archimedes of Syracuse.
The Archimedean property appears in Book V of Euclid's Elements as Definition 4:
Magnitudes are said to have a ratio to one another which can, when multiplied, exceed one another.
Because Archimedes credited it to Eudoxus of Cnidus it is also known as the "Theorem of Eudoxus" or the Eudoxus axiom.[3]
Archimedes used infinitesimals in heuristic arguments, although he denied that those were finished mathematical proofs.
Definition for linearly ordered groups
[edit]Let x and y be positive elements of a linearly ordered group G. Then is infinitesimal with respect to (or equivalently, is infinite with respect to ) if, for any natural number , the multiple is less than , that is, the following inequality holds:
This definition can be extended to the entire group by taking absolute values.
The group is Archimedean if there is no pair such that is infinitesimal with respect to .
Additionally, if is an algebraic structure with a unit (1) — for example, a ring — a similar definition applies to . If is infinitesimal with respect to , then is an infinitesimal element. Likewise, if is infinite with respect to , then is an infinite element. The algebraic structure is Archimedean if it has no infinite elements and no infinitesimal elements.
Ordered fields
[edit]Ordered fields have some additional properties:
- The rational numbers are embedded in any ordered field. That is, any ordered field has characteristic zero.
- If is infinitesimal, then is infinite, and vice versa. Therefore, to verify that a field is Archimedean it is enough to check only that there are no infinitesimal elements, or to check that there are no infinite elements.
- If is infinitesimal and is a rational number, then is also infinitesimal. As a result, given a general element , the three numbers , , and are either all infinitesimal or all non-infinitesimal.
In this setting, an ordered field K is Archimedean precisely when the following statement, called the axiom of Archimedes, holds:
- "Let be any element of . Then there exists a natural number such that ."
Alternatively one can use the following characterization:
Definition for normed fields
[edit]The qualifier "Archimedean" is also formulated in the theory of rank one valued fields and normed spaces over rank one valued fields as follows. Let be a field endowed with an absolute value function, i.e., a function which associates the real number with the field element 0 and associates a positive real number with each non-zero and satisfies and . Then, is said to be Archimedean if for any non-zero there exists a natural number such that
Similarly, a normed space is Archimedean if a sum of terms, each equal to a non-zero vector , has norm greater than one for sufficiently large . A field with an absolute value or a normed space is either Archimedean or satisfies the stronger condition, referred to as the ultrametric triangle inequality, respectively. A field or normed space satisfying the ultrametric triangle inequality is called non-Archimedean.
The concept of a non-Archimedean normed linear space was introduced by A. F. Monna.[4]
Examples and non-examples
[edit]Archimedean property of the real numbers
[edit]The field of the rational numbers can be assigned one of a number of absolute value functions, including the trivial function , when , the more usual , and the -adic absolute value functions. By Ostrowski's theorem, every non-trivial absolute value on the rational numbers is equivalent to either the usual absolute value or some -adic absolute value. The rational field is not complete with respect to non-trivial absolute values; with respect to the trivial absolute value, the rational field is a discrete topological space, so complete. The completion with respect to the usual absolute value (from the order) is the field of real numbers. By this construction the field of real numbers is Archimedean both as an ordered field and as a normed field.[5] On the other hand, the completions with respect to the other non-trivial absolute values give the fields of p-adic numbers, where is a prime integer number (see below); since the -adic absolute values satisfy the ultrametric property, then the -adic number fields are non-Archimedean as normed fields (they cannot be made into ordered fields).
In the axiomatic theory of real numbers, the non-existence of nonzero infinitesimal real numbers is implied by the least upper bound property as follows. Denote by the set consisting of all positive infinitesimals. This set is bounded above by . Now assume for a contradiction that is nonempty. Then it has a least upper bound , which is also positive, so . Since c is an upper bound of and is strictly larger than , is not a positive infinitesimal. That is, there is some natural number for which . On the other hand, is a positive infinitesimal, since by the definition of least upper bound there must be an infinitesimal between and , and if then is not infinitesimal. But , so is not infinitesimal, and this is a contradiction. This means that is empty after all: there are no positive, infinitesimal real numbers.
The Archimedean property of real numbers holds also in constructive analysis, even though the least upper bound property may fail in that context.
Non-Archimedean ordered field
[edit]For an example of an ordered field that is not Archimedean, take the field of rational functions with real coefficients. (A rational function is any function that can be expressed as one polynomial divided by another polynomial; we will assume in what follows that this has been done in such a way that the leading coefficient of the denominator is positive.) To make this an ordered field, one must assign an ordering compatible with the addition and multiplication operations. Now if and only if , so we only have to say which rational functions are considered positive. Call the function positive if the leading coefficient of the numerator is positive. (One must check that this ordering is well defined and compatible with addition and multiplication.) By this definition, the rational function is positive but less than the rational function . In fact, if is any natural number, then is positive but still less than , no matter how big is. Therefore, is an infinitesimal in this field.
This example generalizes to other coefficients. Taking rational functions with rational instead of real coefficients produces a countable non-Archimedean ordered field. Taking the coefficients to be the rational functions in a different variable, say , produces an example with a different order type.
Non-Archimedean valued fields
[edit]The field of the rational numbers endowed with the p-adic metric and the p-adic number fields which are the completions, do not have the Archimedean property as fields with absolute values. All Archimedean valued fields are isometrically isomorphic to a subfield of the complex numbers with a power of the usual absolute value.[6]
Equivalent definitions of Archimedean ordered field
[edit]Every linearly ordered field contains (an isomorphic copy of) the rationals as an ordered subfield, namely the subfield generated by the multiplicative unit of , which in turn contains the integers as an ordered subgroup, which contains the natural numbers as an ordered monoid. The embedding of the rationals then gives a way of speaking about the rationals, integers, and natural numbers in . The following are equivalent characterizations of Archimedean fields in terms of these substructures.[7]
- The natural numbers are cofinal in . That is, every element of is less than some natural number. (This is not the case when there exist infinite elements.) Thus an Archimedean field is one whose natural numbers grow without bound.
- Zero is the infimum in of the set . (If contained a positive infinitesimal it would be a lower bound for the set whence zero would not be the greatest lower bound.)
- The set of elements of between the positive and negative rationals is non-open. This is because the set consists of all the infinitesimals, which is just the set when there are no nonzero infinitesimals, and otherwise is open, there being neither a least nor greatest nonzero infinitesimal. Observe that in both cases, the set of infinitesimals is closed. In the latter case, (i) every infinitesimal is less than every positive rational, (ii) there is neither a greatest infinitesimal nor a least positive rational, and (iii) there is nothing else in between. Consequently, any non-Archimedean ordered field is both incomplete and disconnected.
- For any in the set of integers greater than has a least element. (If were a negative infinite quantity every integer would be greater than it.)
- Every nonempty open interval of contains a rational. (If is a positive infinitesimal, the open interval contains infinitely many infinitesimals but not a single rational.)
- The rationals are dense in with respect to both sup and inf. (That is, every element of is the sup of some set of rationals, and the inf of some other set of rationals.) Thus an Archimedean field is any dense ordered extension of the rationals, in the sense of any ordered field that densely embeds its rational elements.
See also
[edit]- 0.999... – Alternative decimal expansion of 1
- Archimedean ordered vector space – A binary relation on a vector space
- Construction of the real numbers
Notes
[edit]- ^ "Math 2050C Lecture" (PDF). cuhk.edu.hk. Retrieved 3 September 2023.
- ^ G. Fisher (1994) in P. Ehrlich(ed.), Real Numbers, Generalizations of the Reals, and Theories of continua, 107–145, Kluwer Academic
- ^ Knopp, Konrad (1951). Theory and Application of Infinite Series (English 2nd ed.). London and Glasgow: Blackie & Son, Ltd. p. 7. ISBN 0-486-66165-2.
- ^ Monna, A. F. (1943). "Over een lineaire P-adische ruimte". Nederl. Akad. Wetensch. Verslag Afd. Natuurk. (52): 74–84. MR 0015678.
- ^ Neal Koblitz, "p-adic Numbers, p-adic Analysis, and Zeta-Functions", Springer-Verlag,1977.
- ^ Shell, Niel, Topological Fields and Near Valuations, Dekker, New York, 1990. ISBN 0-8247-8412-X
- ^ Schechter 1997, §10.3
References
[edit]- Schechter, Eric (1997). Handbook of Analysis and its Foundations. Academic Press. ISBN 0-12-622760-8. Archived from the original on 7 March 2015. Retrieved 30 January 2009.