This tag is for questions related to conditional convergence. A series or integral is said to be conditionally convergent if it converges, but it does not converge absolutely.
Questions tagged [conditional-convergence]
244 questions
28
votes
4 answers
Why do we ask for *absolute* convergence of a series to define the mean of a discrete random variable?
If $X$ is a discrete random variable that can take the values $x_1, x_2, \dots $ and with probability mass function $f_X$, then we define
its mean by the number $$\sum x_i f_X(x_i) $$ (1)
when the series above is absolutely convergent.
That's the…
Amelian
- 811
24
votes
1 answer
How to use AND condition in Desmos
Sorry maybe it's not typical mathematics question, but Desmos is very helpful in solving and testing mathematics issues, so maybe anyone could help me.
I can't figure it out how to use AND condition in Desmos
For example to make OR you can just use…
pajczur
- 523
22
votes
1 answer
Can $e^x$ be expressed as a linear combination of $(1 + \frac x n)^n$?
Can $e^x$ be expressed as a linear combination of $(1 + \frac x n)^n$? In other words, does there exist an infinite sequence $(a_k)_{k \in \mathbb N_0}$ such that $$e^x = a_0 + \sum_{1 \leq k < \infty} a_k \left(1 + \frac x k\right)^k$$
for all $x…
wlad
- 8,355
22
votes
1 answer
Power series which diverges precisely at the roots of unity, converges elsewhere
Is there a complex power series $\sum a_nz^n$ with radius of convergence $1$ which diverges at the roots of unity (e.g., $z=e^{2\pi i\theta}$, $\theta \in \mathbb{Q}$) and converges elsewhere on the unit circle ($z=e^{2\pi i\theta}$, $\theta \in…
18
votes
4 answers
Theorem 3.54 (about certain rearrangements of a conditionally convergent series) in Baby Rudin: A couple of questions about the proof
Here's the statement of Theorem 3.54 in Principles of Mathematical Analysis by Walter Rudin, 3rd edition:
Let $\sum a_n$ be a series of real numbers which converges, but not absolutely. Suppose
$$-\infty \leq \alpha \leq \beta \leq +\infty.$$
…
Saaqib Mahmood
- 27,542
16
votes
3 answers
Rearrangements that never change the value of a sum
Which bijections $f:\{1,2,3,\ldots\}\to\{1,2,3,\ldots\}$ have the property that for every sequence $\{a_n\}_{n=1}^\infty$,
$$
\lim_{n\to\infty} \sum_{k=1}^n a_k = \lim_{n\to\infty} \sum_{k=1}^n a_{f(k)},
$$
where "$=$" is construed as meaning that…
15
votes
0 answers
Rearranging series and "placid" permutations
This question came out of a conversation with my students about Riemann's rearrangement theorem, and the general problem of which permutations are "safe" w/r/t summing infinite series.
Let $S_\infty$ be the group of permutations of $\mathbb{N}$. For…
Noah Schweber
- 260,658
15
votes
2 answers
When $\Big[ uv \Big]_{x\,:=\,0}^{x\,:=\,1}$ and $\int_{x\,:=\,0}^{x\,:=\,1} v\,du$ are infinite but $\int_{x\,:=\,0}^{x\,:=\,1}u\,dv$ is finite
I have encountered a simple problem in probability where I would not have expected to find conditional convergence lurking about, but there it is. So I wonder:
Is any insight about probability to be drawn from the fact that infinity minus infinity…
12
votes
2 answers
Conditionally convergent power sums
I'm struggling on the following question:
Let $S$ be a (possibly infinite) set of odd positive integers. Prove that
there exists a real sequence $(x_n)$ such that, for each positive integer $k$, the
series $\sum x_n^k$ converges iff $k \in…
Columbo
- 534
- 3
- 16
11
votes
0 answers
Can the Cauchy product of a conditionally convergent series with itself be absolutely convergent?
If $\sum_{n\ge 0} a_n$ and $\sum_{n\ge 0} b_n$ are two series, their Cauchy product is defined as $\sum_{n\ge 0} c_n$, where $c_n = \sum^n_{k=0} a_k b_{n-k}$.
As this question points out, finding two conditionally convergent series whose Cauchy…
Jianing Song
- 2,545
- 5
- 25
11
votes
1 answer
Is it possible that $\sum a_{\sigma(n)}$ converges iff $\sum b_{\sigma(n)}$ diverges for every permutation $\sigma :\mathbb N\to \mathbb N$?
Here is my question: Is it possible to find a pair of series $\sum a_n, \sum b_n,$ each having rearrangements that converge conditionally, such that $\sum a_{\sigma(n)}$ converges iff $\sum b_{\sigma(n)}$ diverges for every permutation $\sigma…
Shingle
- 569
10
votes
3 answers
How do I manipulate the sum of all natural numbers to make it converge to an arbitrary number?
I just found out that the Riemann Series Theorem lets us do the following:
$$\sum_{i=1}^\infty{i}=-\frac{1}{12}$$But it also says (at least according to the wikipedia page on the subject) that a conditionally convergent sum can be manipulated to…
Zluudg
- 329
9
votes
2 answers
For any conditionally convergent series $\sum _{n=1}^\infty a_n,\ \exists\ k\geq 2\ $ such that the subseries $\sum _{n=1}^\infty a_{nk}$ converges.
A subseries of the series $\displaystyle\sum _{n=1}^\infty a_n$ is defined to be a series of the form $\displaystyle\sum _{k=1}^\infty a_{n_k}$, for $n_k \subseteq \Bbb N$.
Prove or disprove: For any conditionally convergent series…
Adam Rubinson
- 24,300
9
votes
1 answer
Does the ordering of a Schauder basis matter in Hilbert space?
If $S=\{v_i\}_{i\in\mathbb N}$ is a (not necessarily orthogonal) Schauder basis for a Hilbert space $H$, must $S$ be an unconditional Schauder basis? I define these terms below because not every source I have found agrees perfectly on the…
WillG
- 7,382
9
votes
4 answers
Why does the commutative property of addition not hold for conditionally convergent series?
I learned about the Riemann rearrangement theorem recently and I'm trying to develop an intuition as to why commutativity breaks down for conditionally convergent series.
I understand the technique used in the theorem, but it just seems really odd…
risto
- 190