Bethe formula

In mathematics, more precisely in measure theory, a measure on the real line is called a discrete measure (in respect to the Lebesgue measure) if its support is at most a countable set. Note that the support need not be a discrete set. Geometrically, a discrete measure (on the real line, with respect to Lebesgue measure) is a collection of point masses.

Definition and properties

A measure ${\displaystyle \mu }$ defined on the Lebesgue measurable sets of the real line with values in ${\displaystyle [0,\mathrm{\infty }]}$ is said to be discrete if there exists a (possibly finite) sequence of numbers

${\displaystyle s_1,s_2,\dots }$

such that

${\displaystyle \mu (\mathbb{ℝ}\mathrm{\setminus }\{s_1,s_2,\dots \})=0.}$

The simplest example of a discrete measure on the real line is the Dirac delta function ${\displaystyle \delta .}$ One has ${\displaystyle \delta (\mathbb{ℝ}\mathrm{\setminus }\{0\})=0}$ and ${\displaystyle \delta (\{0\})=1.}$

More generally, if ${\displaystyle s_1,s_2,\dots }$ is a (possibly finite) sequence of real numbers, ${\displaystyle a_1,a_2,\dots }$ is a sequence of numbers in ${\displaystyle [0,\mathrm{\infty }]}$ of the same length, one can consider the Dirac measures ${\displaystyle {\delta }_{s_i}}$ defined by

${\displaystyle {\delta }_{s_i}(X)=\{\begin{array}{ll}1& \text{ if }{s}_i\in X\\ 0& \text{ if }{s}_i\in ̸X\\ \end{array}}$

for any Lebesgue measurable set ${\displaystyle X.}$ Then, the measure

${\displaystyle \mu =\sum _i{a}_i{\delta }_{s_i}}$

is a discrete measure. In fact, one may prove that any discrete measure on the real line has this form for appropriately chosen sequences ${\displaystyle s_1,s_2,\dots }$ and ${\displaystyle a_1,a_2,\dots }$

Extensions

One may extend the notion of discrete measures to more general measure spaces. Given a measure space ${\displaystyle (X,\mathrm{\Sigma }),}$ and two measures ${\displaystyle \mu }$ and ${\displaystyle \nu }$ on it, ${\displaystyle \mu }$ is said to be discrete in respect to ${\displaystyle \nu }$ if there exists an at most countable subset ${\displaystyle S}$ of ${\displaystyle X}$ such that

1. All singletons ${\displaystyle \{s\}}$ with ${\displaystyle s}$ in ${\displaystyle S}$ are measurable (which implies that any subset of ${\displaystyle S}$ is measurable)
2. ${\displaystyle \nu (S)=0}$
3. ${\displaystyle \mu (X\mathrm{\setminus }S)=0.}$

Notice that the first two requirements are always satisfied for an at most countable subset of the real line if ${\displaystyle \nu }$ is the Lebesgue measure, so they were not necessary in the first definition above.

As in the case of measures on the real line, a measure ${\displaystyle \mu }$ on ${\displaystyle (X,\mathrm{\Sigma })}$ is discrete in respect to another measure ${\displaystyle \nu }$ on the same space if and only if ${\displaystyle \mu }$ has the form

${\displaystyle \mu =\sum _i{a}_i{\delta }_{s_i}}$

where ${\displaystyle S=\{s_1,s_2,\dots \},}$ the singletons ${\displaystyle \{s_i\}}$ are in ${\displaystyle \mathrm{\Sigma },}$ and their ${\displaystyle \nu }$ measure is 0.

One can also define the concept of discreteness for signed measures. Then, instead of conditions 2 and 3 above one should ask that ${\displaystyle \nu }$ be zero on all measurable subsets of ${\displaystyle S}$ and ${\displaystyle \mu }$ be zero on measurable subsets of ${\displaystyle X\mathrm{\setminus }S.}$

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