Range of Uniform convergence of dirchlet series

In summary: The textbook you're using is Arfken et al. (2013), and the person who wrote the answer you are asking for is Euge J. Weierstrass.
  • #36
They are different stated like that because (p...) excludes p, and [p ...] includes p. But once we have that p > 0, they then both exclude p?
 
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  • #37
No, that's not true. The open interval $(a, b)$ is defined as the set of real numbers $x$ such that $a < x < b$; the half-open interval $[a, b)$ is defined as the set of real numbers $x$ such that $a \le x < b$. Here, we may allow $b = \infty$. Thus $(a,\infty)$ consists of those $x$ which satisfy $a < x < \infty$; similarly for $[a,\infty)$. For all real numbers $a$, $a\in [a,\infty)$ but $a\notin (a,\infty)$.
 
  • #38
After some more fiddling with trying to grasp this, (from what you have explained, but also from what my prof said - he will be setting the end of year exam), I came up with the following:

If I was asked to write $ p \lt x \lt \infty $ as an interval, by definition I would write $ x \epsilon (p, \infty) $

If I was then told that $ p \gt 1 $ is a fixed parameter and that we had previously found that p is included in the interval, then I would write $ x \epsilon [p, \infty), p > 1 $ - I hope this is correct and well reasoned?

Then, if I wanted to try and write this semi-closed interval as an algebraic inequality, I would write $ 1 \lt p \lt x \lt \infty $, with p 'fixed' as P > 1

Have I got it?
 
  • #39
You're so close! If you remove the "$x\in$" then you would be absolutely correct. [emoji2]
 
  • #40
Thanks, Euge - but why remove the $ x \epsilon $ ... and do you mean from both places I have used it? ? x is the variable that we are trying to find the range for?
 
  • #41
The notation $x\in (a, b)$ is not interval notation, but it express membership; it's $(a, b)$ itself that's interval notation. That's what I meant.
 
  • #42
Hi Euge, I thought you might like to know, I found that the radius of convergence with the Weierstrauss test MUST be a closed interval, that helped. But what finally put my mind at rest, was to check convergence using the integral test - that showed me very clearly where the parameter (s) comes from.

A sincere thanks for your patience, it all finally came together for me - joy!
 
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