Difference between revisions of "Atom"
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− | == | + | ==Ordered sets== |
− | A minimal non-zero element of a [[ | + | A minimal non-zero element of a [[partially ordered set]] with a zero $0$, i.e. a [[covering element]] of $0$; an element $p > 0$ such that $0<x\leq p$ implies $x=p$. |
+ | |||
==Measure algebras== | ==Measure algebras== | ||
For the definition and relevance in the theory of measure algebras we refer to [[Measure algebra (measure theory)|Measure algebra]]. | For the definition and relevance in the theory of measure algebras we refer to [[Measure algebra (measure theory)|Measure algebra]]. | ||
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If we denote by $\mathcal{N}$ the null sets and consider the standard quotient measure algebra $(\mathcal{S}/\mathcal{N}, \mu)$, then any atom of such quotient measure algebra corresponds to an equivalence class of atoms of $\mu$. | If we denote by $\mathcal{N}$ the null sets and consider the standard quotient measure algebra $(\mathcal{S}/\mathcal{N}, \mu)$, then any atom of such quotient measure algebra corresponds to an equivalence class of atoms of $\mu$. | ||
===Atomic measures=== | ===Atomic measures=== | ||
− | A | + | A σ-finite measure $\mu$ is called ''atomic'' if there is a partition of $X$ into countably many elements of $\mathcal{A}$ which are either atoms or null sets. An atomic probability measure is often called ''atomic distribution''. Examples of atomic distributions are the [[Discrete distribution|discrete distributions]]. |
+ | |||
===Nonatomic measures=== | ===Nonatomic measures=== | ||
− | A measure $\mu$ is called ''nonatomic'' it has no atoms. | + | A measure $\mu$ is called ''nonatomic'' if it has no atoms. |
+ | |||
===Jordan decomposition=== | ===Jordan decomposition=== | ||
If $\mu$ is $\sigma$-finite, it is possible to decompose $\mu$ as $\mu_a+\mu_{na}$, where $\mu_a$ is an atomic measure and $\mu_{na}$ is a nonatomic measure. In case $\mu$ is a probability measure, this means that $\mu$ can be written as $p \mu_a + (1-p) \mu_{na}$, where $p\in [0,1]$, $\mu_a$ is an atomic probability measure and $\mu_{na}$ a nonatomic probability measure (see {{Cite|Fe}}), which is sometimes called a [[Continuous distribution|continuous distribution]]. This decomposition is sometimes called ''Jordan decomposition'', although several authors use this name in other contexts, see [[Jordan decomposition]]. | If $\mu$ is $\sigma$-finite, it is possible to decompose $\mu$ as $\mu_a+\mu_{na}$, where $\mu_a$ is an atomic measure and $\mu_{na}$ is a nonatomic measure. In case $\mu$ is a probability measure, this means that $\mu$ can be written as $p \mu_a + (1-p) \mu_{na}$, where $p\in [0,1]$, $\mu_a$ is an atomic probability measure and $\mu_{na}$ a nonatomic probability measure (see {{Cite|Fe}}), which is sometimes called a [[Continuous distribution|continuous distribution]]. This decomposition is sometimes called ''Jordan decomposition'', although several authors use this name in other contexts, see [[Jordan decomposition]]. | ||
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If $\mu$ is a $\sigma$-finite measure on the [[Borel set|Borel $\sigma$-algebra]] of $\mathbb R^n$, then it is easy to show that, for any atom $B$ of $\mu$ there is a point $x\in B$ with the property that $\mu (B) = \mu (\{x\})$. Thus such a measure is atomic if and only if it is the countable sum of [[Delta-function|Dirac deltas]], i.e. if there is an (at most) countable set $\{x_i\}\subset \mathbb R^n$ and an (at most) countable set $\{\alpha_i\}\subset ]0, \infty[$ with the property that | If $\mu$ is a $\sigma$-finite measure on the [[Borel set|Borel $\sigma$-algebra]] of $\mathbb R^n$, then it is easy to show that, for any atom $B$ of $\mu$ there is a point $x\in B$ with the property that $\mu (B) = \mu (\{x\})$. Thus such a measure is atomic if and only if it is the countable sum of [[Delta-function|Dirac deltas]], i.e. if there is an (at most) countable set $\{x_i\}\subset \mathbb R^n$ and an (at most) countable set $\{\alpha_i\}\subset ]0, \infty[$ with the property that | ||
\[ | \[ | ||
− | \mu (A) = \sum_{x_i\in A} \alpha_i \qquad \mbox{for every Borel set | + | \mu (A) = \sum_{x_i\in A} \alpha_i \qquad \mbox{for every Borel set } A\, . |
\] | \] | ||
+ | |||
===Sierpinski's theorem=== | ===Sierpinski's theorem=== | ||
A nonatomic measure takes a continuum of values. This is a corollary of the following Theorem due to Sierpinski (see {{Cite|Si}}): | A nonatomic measure takes a continuum of values. This is a corollary of the following Theorem due to Sierpinski (see {{Cite|Si}}): | ||
'''Theorem''' | '''Theorem''' | ||
− | If $\mu$ is a nonatomic measure on a $\sigma$-algebra $\mathcal{A}$ and $A\in \mathcal{A}$ an element such that $\mu (A)>0$, then for every $b\in [0, \mu ( | + | If $\mu$ is a nonatomic measure on a $\sigma$-algebra $\mathcal{A}$ and $A\in \mathcal{A}$ an element such that $\mu (A)>0$, then for every $b\in [0, \mu (A)]$ there is an element $B\in \mathcal{A}$ with $B\subset A$ and $\mu (B) = b$. |
+ | |||
+ | ==Set theory== | ||
+ | In some models of set theory, an atom or ''urelement'' is an entity which may be an element of a set, but which itself can have no elements. Zermelo–Fraenkel [[axiomatic set theory]] with atoms is denoted ZFA (see {{Cite|Je}}). | ||
==Comment== | ==Comment== | ||
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|- | |- | ||
|valign="top"|{{Ref|Fe}}|| W. Feller, "An introduction to probability theory and its applications"|"An introduction to probability theory and its applications", '''2''', Wiley (1971). | |valign="top"|{{Ref|Fe}}|| W. Feller, "An introduction to probability theory and its applications"|"An introduction to probability theory and its applications", '''2''', Wiley (1971). | ||
+ | |- | ||
+ | |valign="top"|{{Ref|Je}}|| T. Jech, "Set theory. The third millennium edition, revised and expanded" Springer Monographs in Mathematics (2003). {{ISBN|3-540-44085-2}} {{ZBL|1007.03002}} | ||
|- | |- | ||
|valign="top"|{{Ref|Lo}}|| M. Loève, "Probability theory", Princeton Univ. Press (1963). {{MR|0203748}} {{ZBL|0108.14202}} | |valign="top"|{{Ref|Lo}}|| M. Loève, "Probability theory", Princeton Univ. Press (1963). {{MR|0203748}} {{ZBL|0108.14202}} | ||
|- | |- | ||
− | |valign="top"|{{Ref|Si}}|| W. | + | |valign="top"|{{Ref|Si}}|| W. Sierpiński, "Sur les fonctions d’ensemble additives et continues", '''3''', Fund. Math. (1922) pp. 240-246 {{ZBL|48.0279.04}} |
|- | |- | ||
|} | |} |
Latest revision as of 19:18, 14 November 2023
2020 Mathematics Subject Classification: Primary: 03E04 [MSN][ZBL] in set theory
2020 Mathematics Subject Classification: Primary: 28A [MSN][ZBL] in measure theory
Ordered sets
A minimal non-zero element of a partially ordered set with a zero $0$, i.e. a covering element of $0$; an element $p > 0$ such that $0<x\leq p$ implies $x=p$.
Measure algebras
For the definition and relevance in the theory of measure algebras we refer to Measure algebra.
Classical measure theory
Definition
Let $\mu$ be a (nonnegative) measure on a $\sigma$-algebra $\mathcal{S}$ of subsets of a set $X$. An element $a\in \mathcal{S}$ is called an atom of $\mu$ if
- $\mu (A)>0$;
- For every $B\in \mathcal{S}$ with $B\subset A$ either $\mu (B)=0$ or $\mu (B)=\mu (A)$
(cp. with Section IV.9.8 of [DS] or [Fe]).
Remark If we denote by $\mathcal{N}$ the null sets and consider the standard quotient measure algebra $(\mathcal{S}/\mathcal{N}, \mu)$, then any atom of such quotient measure algebra corresponds to an equivalence class of atoms of $\mu$.
Atomic measures
A σ-finite measure $\mu$ is called atomic if there is a partition of $X$ into countably many elements of $\mathcal{A}$ which are either atoms or null sets. An atomic probability measure is often called atomic distribution. Examples of atomic distributions are the discrete distributions.
Nonatomic measures
A measure $\mu$ is called nonatomic if it has no atoms.
Jordan decomposition
If $\mu$ is $\sigma$-finite, it is possible to decompose $\mu$ as $\mu_a+\mu_{na}$, where $\mu_a$ is an atomic measure and $\mu_{na}$ is a nonatomic measure. In case $\mu$ is a probability measure, this means that $\mu$ can be written as $p \mu_a + (1-p) \mu_{na}$, where $p\in [0,1]$, $\mu_a$ is an atomic probability measure and $\mu_{na}$ a nonatomic probability measure (see [Fe]), which is sometimes called a continuous distribution. This decomposition is sometimes called Jordan decomposition, although several authors use this name in other contexts, see Jordan decomposition.
Measures in the euclidean space
If $\mu$ is a $\sigma$-finite measure on the Borel $\sigma$-algebra of $\mathbb R^n$, then it is easy to show that, for any atom $B$ of $\mu$ there is a point $x\in B$ with the property that $\mu (B) = \mu (\{x\})$. Thus such a measure is atomic if and only if it is the countable sum of Dirac deltas, i.e. if there is an (at most) countable set $\{x_i\}\subset \mathbb R^n$ and an (at most) countable set $\{\alpha_i\}\subset ]0, \infty[$ with the property that \[ \mu (A) = \sum_{x_i\in A} \alpha_i \qquad \mbox{for every Borel set } A\, . \]
Sierpinski's theorem
A nonatomic measure takes a continuum of values. This is a corollary of the following Theorem due to Sierpinski (see [Si]):
Theorem If $\mu$ is a nonatomic measure on a $\sigma$-algebra $\mathcal{A}$ and $A\in \mathcal{A}$ an element such that $\mu (A)>0$, then for every $b\in [0, \mu (A)]$ there is an element $B\in \mathcal{A}$ with $B\subset A$ and $\mu (B) = b$.
Set theory
In some models of set theory, an atom or urelement is an entity which may be an element of a set, but which itself can have no elements. Zermelo–Fraenkel axiomatic set theory with atoms is denoted ZFA (see [Je]).
Comment
By a natural extension of meaning, the term atom is also used for an object of a category having no subobjects other than itself and the null subobject (cf. Null object of a category).
References
[DS] | N. Dunford, J.T. Schwartz, "Linear operators. General theory", 1, Interscience (1958). MR0117523 Zbl 0635.47001 |
[Fe] | "An introduction to probability theory and its applications", 2, Wiley (1971). |
[Je] | T. Jech, "Set theory. The third millennium edition, revised and expanded" Springer Monographs in Mathematics (2003). ISBN 3-540-44085-2 Zbl 1007.03002 |
[Lo] | M. Loève, "Probability theory", Princeton Univ. Press (1963). MR0203748 Zbl 0108.14202 |
[Si] | W. Sierpiński, "Sur les fonctions d’ensemble additives et continues", 3, Fund. Math. (1922) pp. 240-246 Zbl 48.0279.04 |
Atom. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Atom&oldid=28002