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Special functions, orthogonal polynomials, harmonic analysis, ordinary differential equations (ODE's), differential relations, calculus of variations, approximations, expansions, asymptotics.
0
votes
Fourier transform in $L^1$?
We have the following characterization:
The space $V:=\{\widehat f\colon f\in L^1(\textbf R)\}$ is equal to the space $W=\{h*g\colon h \text{ and } g\in L^2(\textbf R)\}$. That is the Fourier transf …
1
vote
Asymptotic analysis of $x_{n+1} = \frac{x_n}{n^2} + \frac{n^2}{x_n} + 2$
This is only a suggestion about how to get more terms of the asymptotic expansion.
Numerical experiments suggest that the sequences $x_{2n}$ and $x_{2n+1}$ have different asymptotic expression of type …
2
votes
Factoring Bessel functions into an amplitude and a phase
Not an answer but too large for a comment.
In my paper with van de Lune On the exact location of the non-trivial zeros f Riemann's zeta function, it is proved.
Theorem. If $f\colon\mathbf{R}\to\math …
5
votes
Accepted
Non-asymptotic upper bound of right tail of Gamma function
In Gabcke thesis, that you can download at
http://hdl.handle.net/11858/00-1735-0000-0022-6013-8
page 84 you can find
Theorem: The incomplete gamma function
$$\Gamma(a,x)=\int_x^\infty e^{-v}v^{a-1 …
14
votes
Accepted
A conjecture about certain values of the Fabius function
I have posted in arXiv:1702.05442 the English translation of a paper about Fabius
function that I published in Spanish in 1982 (we will refer to it as (A)).
With the Theorems in this paper
the ques …
2
votes
Approximate identities and pointwise convergence
Not exactly an answer, but too long for a comment.
Assume there is such approximation to the identity. We may define a linear form
$u\colon L^1(T)\to C$ by
$$u(f)=\lim_{\varepsilon\to0} f*k_{\varep …
2
votes
Accepted
Proof of Euler's reflection formula via rapidly decreasing Fourier series
The function $\sigma\mapsto f(\sigma+it)$ is periodic with period $1$, for any value
of $t$. Therefore
$$f(\sigma+it)=\sum_{n\in Z} c_n(t)e^{2\pi i n\sigma}.$$
It follows that
$$c_n(t)=\int_0^1 f(x+i …
7
votes
Accepted
Asymptotic behaviour of an integral
With the aid of Mathematica I found that
$$g(\theta)=\textrm{EllipticK}(a^2)-\textrm{EllipticF}(t,a^2).$$
I get the first terms of the asymptotic expansion
$$\frac{\sqrt{\pi}}{2\sqrt{k}}-\frac{\sqrt{ …
10
votes
Accepted
Interesting triple integral
I consider the function
$$f(t):=\int_0^t\frac{dx}{x}\int_0^x\frac{dy}{y}\int_0^y\frac{dz}{z}\bigl\{
\sin x+\sin(x-y)-\sin(x-z)-\sin(x-y+z)\bigr\}.$$
It has an asymptotic expansion with main terms
$$f( …
4
votes
Prove that the Dirichlet eta function is monotonic
This is Theorem 3 (p. 10) in the Report:
J. van de Lune, Some inequalities involving Riemann's zeta-function,
CWI Report ZW 50/75, CentruM Wiskunde & Informatica, Amsterdam,1975,
in which the proo …
94
votes
Accepted
A hard integral identity on MathSE
I have proved this equality by means of Cauchy’s Theorem
applied to an adequate function. Since my solution is too long to post it
here, I posted it in arXiv:
Juan Arias de Reyna, Computation of a De …
10
votes
1
answer
539
views
Is $Q_n(x)=\sigma_{n+1}(x)/\sigma_n(x)$ logarithmically convex on $\mathbf{R}$?
In 1975 J. van de Lune considered the monotony properties of the canonical Riemann Upper and Lower sums for $\int_0^1 t^xdt$, with $x>0$.
Writing $\sigma_n(x) := 1^x+2^x+\cdots+n^x$ these sums are
$$ …
16
votes
Accepted
Is the following function decreasing on $(0,1)$?
First we put it in the notation of Mathematica $K(k)$ is $K(k^2)$.
So our function will be
$$f(k)= k K(k^2)\sinh\Bigl(\frac{\pi}{2}\frac{K(1-k^2)}{K(k^2)}\Bigr).$$
Now we change variables (W486, Whit …
1
vote
Limit connected with a periodic function
In the paper
J. Rosenblatt, Convergence of Series of Translations, Math. Ann. 230 (1977) 245-272
it is proved a general Theorem (Theorem 2.5) that in particular proves the
convergence a. e. . Als …