Looking for infinite series resembling an exponential
$begingroup$
I'm looking for some $f(x)$ that has the following property:
$sum_{x=1}^infty f(kx) = r^k$
for some real $0 < r < 1$, and at least for strictly positive integer $k$.
Does such an $f(x)$ exist?
This could also be thought of in terms of some sequence of real numbers $f[n]$.
I posted this at MSE but got no answer, so thought I would try MO.
real-analysis sequences-and-series power-series
$endgroup$
add a comment |
$begingroup$
I'm looking for some $f(x)$ that has the following property:
$sum_{x=1}^infty f(kx) = r^k$
for some real $0 < r < 1$, and at least for strictly positive integer $k$.
Does such an $f(x)$ exist?
This could also be thought of in terms of some sequence of real numbers $f[n]$.
I posted this at MSE but got no answer, so thought I would try MO.
real-analysis sequences-and-series power-series
$endgroup$
add a comment |
$begingroup$
I'm looking for some $f(x)$ that has the following property:
$sum_{x=1}^infty f(kx) = r^k$
for some real $0 < r < 1$, and at least for strictly positive integer $k$.
Does such an $f(x)$ exist?
This could also be thought of in terms of some sequence of real numbers $f[n]$.
I posted this at MSE but got no answer, so thought I would try MO.
real-analysis sequences-and-series power-series
$endgroup$
I'm looking for some $f(x)$ that has the following property:
$sum_{x=1}^infty f(kx) = r^k$
for some real $0 < r < 1$, and at least for strictly positive integer $k$.
Does such an $f(x)$ exist?
This could also be thought of in terms of some sequence of real numbers $f[n]$.
I posted this at MSE but got no answer, so thought I would try MO.
real-analysis sequences-and-series power-series
real-analysis sequences-and-series power-series
asked 4 hours ago
Mike BattagliaMike Battaglia
1,036523
1,036523
add a comment |
add a comment |
1 Answer
1
active
oldest
votes
$begingroup$
You can solve this system of equations explicitly in terms of the function
$$F(z)=sum_{m=1}^{infty} mu(m)z^m=z-z^2-z^3-z^5+z^6+cdots$$
which can be shown to be transcendental (see the paper "Transcendence of Power Series for Some Number Theoretic Functions", by Coons and Borwein). With this notation your sequence can be succinctly expressed as
$$f(n)=F(r^n).$$
Indeed, one can check that
$$sum_{n=1}^{infty} f(kn)=sum_{n=1}^{infty} F(r^{kn})=sum_{m,n=1}^{infty} mu(m)r^{nmk}=sum_{m=1}^{infty}sum_{d|m}mu(d)r^{mk}=r^k$$
as desired.
$endgroup$
add a comment |
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1 Answer
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1 Answer
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active
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$begingroup$
You can solve this system of equations explicitly in terms of the function
$$F(z)=sum_{m=1}^{infty} mu(m)z^m=z-z^2-z^3-z^5+z^6+cdots$$
which can be shown to be transcendental (see the paper "Transcendence of Power Series for Some Number Theoretic Functions", by Coons and Borwein). With this notation your sequence can be succinctly expressed as
$$f(n)=F(r^n).$$
Indeed, one can check that
$$sum_{n=1}^{infty} f(kn)=sum_{n=1}^{infty} F(r^{kn})=sum_{m,n=1}^{infty} mu(m)r^{nmk}=sum_{m=1}^{infty}sum_{d|m}mu(d)r^{mk}=r^k$$
as desired.
$endgroup$
add a comment |
$begingroup$
You can solve this system of equations explicitly in terms of the function
$$F(z)=sum_{m=1}^{infty} mu(m)z^m=z-z^2-z^3-z^5+z^6+cdots$$
which can be shown to be transcendental (see the paper "Transcendence of Power Series for Some Number Theoretic Functions", by Coons and Borwein). With this notation your sequence can be succinctly expressed as
$$f(n)=F(r^n).$$
Indeed, one can check that
$$sum_{n=1}^{infty} f(kn)=sum_{n=1}^{infty} F(r^{kn})=sum_{m,n=1}^{infty} mu(m)r^{nmk}=sum_{m=1}^{infty}sum_{d|m}mu(d)r^{mk}=r^k$$
as desired.
$endgroup$
add a comment |
$begingroup$
You can solve this system of equations explicitly in terms of the function
$$F(z)=sum_{m=1}^{infty} mu(m)z^m=z-z^2-z^3-z^5+z^6+cdots$$
which can be shown to be transcendental (see the paper "Transcendence of Power Series for Some Number Theoretic Functions", by Coons and Borwein). With this notation your sequence can be succinctly expressed as
$$f(n)=F(r^n).$$
Indeed, one can check that
$$sum_{n=1}^{infty} f(kn)=sum_{n=1}^{infty} F(r^{kn})=sum_{m,n=1}^{infty} mu(m)r^{nmk}=sum_{m=1}^{infty}sum_{d|m}mu(d)r^{mk}=r^k$$
as desired.
$endgroup$
You can solve this system of equations explicitly in terms of the function
$$F(z)=sum_{m=1}^{infty} mu(m)z^m=z-z^2-z^3-z^5+z^6+cdots$$
which can be shown to be transcendental (see the paper "Transcendence of Power Series for Some Number Theoretic Functions", by Coons and Borwein). With this notation your sequence can be succinctly expressed as
$$f(n)=F(r^n).$$
Indeed, one can check that
$$sum_{n=1}^{infty} f(kn)=sum_{n=1}^{infty} F(r^{kn})=sum_{m,n=1}^{infty} mu(m)r^{nmk}=sum_{m=1}^{infty}sum_{d|m}mu(d)r^{mk}=r^k$$
as desired.
answered 3 hours ago
Gjergji ZaimiGjergji Zaimi
62.8k4163310
62.8k4163310
add a comment |
add a comment |
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