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Automatic multiline content in X column together with adjusted arraystretch

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I have a table that

  1. has long row headings that should wrap with hanging indent (as a >{raggedrighthangindent=1em}X column would
  2. has multiline content in the cells of the table body
  3. should adjust to a size of page (e.g. using tabularx)
  4. should have line spacing adjusted (e.g. by adjusting arraystretch)

Is it possible to achieve the desired look without manually dividing the row headings as I have done in my code?

Desired look

Desired look

documentclass{article}
usepackage{tabularx}
begin{document}
  begin{table}[p]
    renewcommand{arraystretch}{2}  % Exaggregated for the sake of clarity
    begin{tabularx}{linewidth}{X *{4}{c}}
      The first row heading runs over one line             &  123  &  123  &  123  &  123  \
                                                           & (456) & (456) & (456) & (456) \
      [1em]
      The third row heading is slightly longer and         &  123  &  123  &  123  &  123  \
      hspace{1em} runs over two lines                     & (456) & (456) & (456) & (456) \
      [1em]
      The third row heading is actually quite              &  123  &  123  &  123  &  123  \
      hspace{1em} outrageously long and runs over a total & (456) & (456) & (456) & (456) \
      hspace{1em} of three lines
    end{tabularx}
  end{table}
end{document}

My attempts

I have tried using the multirow package, but there I need to tell it how many lines (rather than cells) each cell will occupy and I can't make it play nice with my adjustment of arraystretch.

I think that tabularray might be the way to go, but I can't figure out how to adjust linespacing in the row headings and how to add the hanging indent

documentclass{article}
usepackage{tabularray}
begin{document}
  begin{table}[p]
    begin{tblr}{
      colspec={@{}Xcccc@{}},
      width=linewidth,
      stretch=0,
      rows={ht=2baselineskip},
    }
      SetCell[r=2]{m}The first row heading runs over one line                                                       &  123  &  123  &  123  &  123  \
                                                                                                                     & (456) & (456) & (456) & (456) \
      [1em]
      SetCell[r=2]{m}The second row heading is slightly longer and runs over two lines                              &  123  &  123  &  123  &  123  \
                                                                                                                     & (456) & (456) & (456) & (456) \
      [1em]
      SetCell[r=2]{m}The third row heading is actually quite outrageously long and runs over a total of three lines &  123  &  123  &  123  &  123  \
                                                                                                                     & (456) & (456) & (456) & (456) \
    end{tblr}
  end{table}
end{document}

Result from tabularray attempt


   
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$begingroup$

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$begingroup$

I am reading Mattila’s “Fourier analysis and Hausdorff dimension”, the author leaves as an exercise to prove that the set $S_infty$ is a Borel set. I will now define the set $S_infty$:

Theorem 5.1: Let $Asubsetmathbb{R}^n$ be a Borel set with $text{dim}A=sleq1$. Then for all $tin[0,s]$
$$ text{dim}{ ein S^{n-1} : text{dim}P_e(A)<t }leq n-2+t $$

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This is what I tried doing:

begin{align*}
I_sigma(mu_e) = int_{-infty}^inftyint_{-infty}^infty |x-y|^{-sigma},dmu_ex,dmu_ey &= int_{mathbb{R}^n}int_{mathbb{R}^n} |ecdotxi – ecdotzeta|^{-sigma},dmu xi,dmuzeta \
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&= int_{mathbb{R}^n}int_{mathbb{R}^n} |xi – zeta|^{sigma},dmuxi,dmuzeta\
&= I_sigma(mu),
end{align*}

where I’m using that because $ein S^{n-1}$ then $|e| =1$. But then I get stuck and I do not know how to continue with the calculations, because the set
$${ ein S^{n-1} : I_sigma(mu)=infty }$$
doesn’t make sense to me, maybe my previous calculation is wrong.

$endgroup$

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Hi! I am reading Cox’s “Primes of the Form $x^2 + ny^2$“, and am on Chapter 5 (it’s a speedrun from number fields to Hilbert’s class field). I am attempting exercise 5.1, and I have done some parts, so I am both asking for verification for my solution as well as hints for the rest.

Things we have stated:

Proposition 5.3. For a number field $K$

(i) $mathcal{O}_K$ is a subring of $mathbb{C}$ whose field of fractions is $K$.

(ii) $mathcal{O}_K$ is a free $mathbb{Z}$-module of rank $[K : mathbb{Q}]$.


(a) Show that a nonzero ideal $mathfrak{a}$ of $mathcal{O}_K$ contains a nonzero integer $m$. (Hint: …)

My solution: Let $alpha neq 0$ be in $mathfrak{a}$. Of course it is algebraic, so let the monic integer polynomial $f(x) = a_0 + a_1x + cdots + a_{n – 1}x^{n – 1} + x^n$ be its minimal polynomial. Now, $langle alpha rangle subset mathfrak{a}$. In particular, for all integers $i geq 1$, the elements $alpha^i$ are in $mathfrak{a}$. This then means $sum_{i geq 1} a_i alpha^i in mathfrak{a}$, and since $f(alpha) = 0 in mathfrak{a}$, we have $m = a_0 in mathfrak{a}$.


(b) Show that $mathcal{O}_K / mathfrak{a}$ is finite whenever $mathfrak{a}$ is a nonzero ideal of $mathcal{O}_K$. Hint: if $m$ is the integer from (a), consider the surjection $mathcal{O}_K / mmathcal{O}_K to mathcal{O}_K / mathfrak{a}$. Use part (ii) of Proposition 5.3 to compute the order of $mathcal{O}_K / mmathcal{O}_K$.

My Ideas: From above, we know that $langle m rangle subset langle alpha rangle subset mathfrak{a}$, so my intuition tells me that this surjection definitely exists. (In my intuition, everything’s a module / vector space, so this surjection is just a projection map?) However, I don’t know how to explicitly describe it.

To compute $left|mathcal{O}_K / mmathcal{O}_Kright|$, from the proposition above we know that $mathcal{O}_K cong mathbb{Z}^{[K : mathbb{Q}]}$, so $mathcal{O}_K / mmathcal{O}_K$ is just $left(mathbb{Z} / mmathbb{Z}right)^{[K : mathbb{Q}]}$ and the order is $m^{[K : mathbb{Q}]}$. This part makes sense but feels a little hand wavy? Or is it justified as is?


(c) Use (b) to show that every nonzero ideal of $mathcal{O}_K$ is a free $mathbb{Z}$-module of rank $[K : mathbb{Q}]$.

My solution: Fix a nonzero ideal $mathfrak{a} subset mathcal{O}_K$. We know that $mathcal{O}_K / mathfrak{a}$ is finite and $mathcal{O}_K cong mathbb{Z}^{[K : mathbb{Q}]}$, so $mathfrak{a}$ has to be a product of $[K : mathbb{Q}]$ infinite subgroups of $mathbb{Q}$, i.e. $mathfrak{a} cong prod_{i = 1}^{[K : mathbb{Q}]} m_imathbb{Z}$. This is easy to prove by a simple proof by contradiction.


(d) If we have ideals $mathfrak{a}_1 subset mathfrak{a}_2 subset cdots$, show that there is an integer $n$ such that $mathfrak{a}_n = mathfrak{a}_{n + 1} = cdots$. Hint: consider the surjections $mathcal{O}_K / mathfrak{a}_1 to mathcal{O}_K / mathfrak{a}_2 to cdots$, and use (b).

My solution: Again, my intuition tells me the surjections $mathcal{O}_K / mathfrak{a}_i to mathcal{O}_K / mathfrak{a}_{i + 1}$ exists, but I don’t know how to construct them. Anyways, I claim that if $mathfrak{a}_i neq mathfrak{a}_{i + 1}$, then $left|mathcal{O}_K / mathfrak{a}_{i + 1}right| < left|mathcal{O}_K / mathfrak{a}_iright|$. This holds because for $alpha in mathfrak{a}_{i + 1} setminus mathfrak{a}_i$ is a nonzero element in the kernel of the surjection. Since the quotients are finite, it must eventually stop and hence there are no infinite ascending chains.


(e) Use (b) to show that a nonzero prime ideal of $mathcal{O}_K$ is maximal.

My ideas: Let $mathfrak{a}$ be a prime ideal of $mathcal{O}_K$, and suppose that $mathfrak{a} supset mathfrak{b}$ (i.e. $mathfrak{a}$ is not maximal), which gives $mathcal{O}_K / mathfrak{b} subset mathcal{O}_K / mathfrak{a}$. Thinking about everything as $mathbb{Z}$-modules, we can write $mathcal{O}_K cong prod_{i = 1}^{[K : mathbb{Q}]} mathbb{Z}$ as ordered coordinates, and similar that $mathcal{O}_K / mathfrak{b} cong prod_{i = 1}^{[K : mathbb{Q}]} mathbb{Z} / m_i mathbb{Z}$ and $mathcal{O}_K / mathfrak{a} cong prod_{i = 1}^{[K : mathbb{Q}]} mathbb{Z} / n_i mathbb{Z}$. By the inclusion, we know that $m_i mid n_i$, and for at least one $j$, $m_j neq n_j$. However, for such $j$ we have that $n_j = m_j cdot left(frac{n_j}{m_j}right)$ i.e. $mathbb{Z} / n_j mathbb{Z}$ is not an integral domain, and hence the product ring is not an integral domain, which means $mathfrak{a}$ is not prime.


For you for your help in advance!

enter image description here

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