Difference between revisions of "Formal Dirichlet series"
(Start article) |
m (→References: isbn link) |
||
(One intermediate revision by one other user not shown) | |||
Line 1: | Line 1: | ||
A formal Dirichlet series over a ring $R$ is associated to a function $a$ from the positive integers to $R$ | A formal Dirichlet series over a ring $R$ is associated to a function $a$ from the positive integers to $R$ | ||
− | + | $$ | |
− | + | L(a,s) = \sum_{n=1}^\infty a(n) n^{-s} | |
− | + | $$ | |
with addition and multiplication defined by | with addition and multiplication defined by | ||
− | + | $$ | |
− | + | L(a,s) + L(b,s) = \sum_{n=1}^\infty (a+b)(n) n^{-s} | |
− | + | $$ | |
− | + | $$ | |
+ | L(a,s) \cdot L(b,s) = \sum_{n=1}^\infty (a*b)(n) n^{-s} | ||
+ | $$ | ||
where | where | ||
− | + | $$ | |
− | + | (a+b)(n) = a(n)+b(n) | |
− | + | $$ | |
is the [[pointwise operation|pointwise]] sum and | is the [[pointwise operation|pointwise]] sum and | ||
+ | $$ | ||
+ | (a*b)(n) = \sum_{k|n} a(k)b(n/k) | ||
+ | $$ | ||
+ | is the [[Dirichlet convolution]] of $a$ and $b$. | ||
− | + | The formal Dirichlet series form a ring $\Omega$, indeed an $R$-algebra, with the zero function as additive zero element and the function $\delta$ defined by $\delta(1)=1$, $\delta(n)=0$ for $n>1$ (so that $L(\delta,s)=1$) as multiplicative identity. An element of this ring is invertible if $a(1)$ is invertible in $R$. If $R$ is commutative, so is $\Omega$; if $R$ is an integral domain, so is $\Omega$. The non-zero multiplicative functions form a subgroup of the group of units of $\Omega$. | |
− | |||
− | |||
− | |||
− | The formal Dirichlet series form a ring $\Omega$, indeed an $R$-algebra, with the zero function as additive zero element and the function $\delta$ defined by $\delta(1)=1$, $\delta(n)=0$ for $n>1$ (so that $ | ||
The ring of formal Dirichlet series over $\mathbb{C}$ is isomorphic to a ring of formal power series in countably many variables. | The ring of formal Dirichlet series over $\mathbb{C}$ is isomorphic to a ring of formal power series in countably many variables. | ||
− | The function $a$ is [[Multiplicative arithmetic function|multiplicative]] if and only if there is a formal [[Euler identity]] beween the Dirichlet series $ | + | The function $a$ is [[Multiplicative arithmetic function|multiplicative]] if and only if there is a formal [[Euler identity]] beween the Dirichlet series $L(a,s)$ and a formal [[Euler product]] over primes |
$$ | $$ | ||
L(a,s) = \sum_n a_n n^{-s} = \prod_p (1+a_p p^{-s} + a_{p^2} p^{-2s} + \cdots ) | L(a,s) = \sum_n a_n n^{-s} = \prod_p (1+a_p p^{-s} + a_{p^2} p^{-2s} + \cdots ) | ||
Line 33: | Line 35: | ||
==References== | ==References== | ||
* E.D. Cashwell, C.J. Everett,. "The ring of number-theoretic functions", ''Pacific J. Math.'' '''9''' (1959) 975-985 {{ZBL|0092.04602}} {{MR|0108510}} | * E.D. Cashwell, C.J. Everett,. "The ring of number-theoretic functions", ''Pacific J. Math.'' '''9''' (1959) 975-985 {{ZBL|0092.04602}} {{MR|0108510}} | ||
− | * Henri Cohen, "Number Theory: Volume II: Analytic and Modern Tools", Graduate Texts in Mathematics '''240''', Springer (2008) ISBN 0-387-49894-X {{ZBL|1119.11002}} | + | * Henri Cohen, "Number Theory: Volume II: Analytic and Modern Tools", Graduate Texts in Mathematics '''240''', Springer (2008) {{ISBN|0-387-49894-X}} {{ZBL|1119.11002}} |
− | * Gérald Tenenbaum, "Introduction to Analytic and Probabilistic Number Theory", Cambridge Studies in Advanced Mathematics '''46''', Cambridge University Press (1995) ISBN 0-521-41261-7 {{ZBL|0831.11001}} | + | * Gérald Tenenbaum, "Introduction to Analytic and Probabilistic Number Theory", Cambridge Studies in Advanced Mathematics '''46''', Cambridge University Press (1995) {{ISBN|0-521-41261-7}} {{ZBL|0831.11001}} |
+ | |||
+ | {{TEX|done}} |
Latest revision as of 17:25, 11 November 2023
A formal Dirichlet series over a ring $R$ is associated to a function $a$ from the positive integers to $R$ $$ L(a,s) = \sum_{n=1}^\infty a(n) n^{-s} $$ with addition and multiplication defined by $$ L(a,s) + L(b,s) = \sum_{n=1}^\infty (a+b)(n) n^{-s} $$ $$ L(a,s) \cdot L(b,s) = \sum_{n=1}^\infty (a*b)(n) n^{-s} $$ where $$ (a+b)(n) = a(n)+b(n) $$ is the pointwise sum and $$ (a*b)(n) = \sum_{k|n} a(k)b(n/k) $$ is the Dirichlet convolution of $a$ and $b$.
The formal Dirichlet series form a ring $\Omega$, indeed an $R$-algebra, with the zero function as additive zero element and the function $\delta$ defined by $\delta(1)=1$, $\delta(n)=0$ for $n>1$ (so that $L(\delta,s)=1$) as multiplicative identity. An element of this ring is invertible if $a(1)$ is invertible in $R$. If $R$ is commutative, so is $\Omega$; if $R$ is an integral domain, so is $\Omega$. The non-zero multiplicative functions form a subgroup of the group of units of $\Omega$.
The ring of formal Dirichlet series over $\mathbb{C}$ is isomorphic to a ring of formal power series in countably many variables.
The function $a$ is multiplicative if and only if there is a formal Euler identity beween the Dirichlet series $L(a,s)$ and a formal Euler product over primes $$ L(a,s) = \sum_n a_n n^{-s} = \prod_p (1+a_p p^{-s} + a_{p^2} p^{-2s} + \cdots ) $$ and is totally multiplicative if the Euler product is of the form $$ L(a,s) = \sum_n a_n n^{-s} = \prod_p (1 - a_p p^{-s})^{-1} \ . $$
References
- E.D. Cashwell, C.J. Everett,. "The ring of number-theoretic functions", Pacific J. Math. 9 (1959) 975-985 Zbl 0092.04602 MR0108510
- Henri Cohen, "Number Theory: Volume II: Analytic and Modern Tools", Graduate Texts in Mathematics 240, Springer (2008) ISBN 0-387-49894-X Zbl 1119.11002
- Gérald Tenenbaum, "Introduction to Analytic and Probabilistic Number Theory", Cambridge Studies in Advanced Mathematics 46, Cambridge University Press (1995) ISBN 0-521-41261-7 Zbl 0831.11001
Formal Dirichlet series. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Formal_Dirichlet_series&oldid=36940