# Difference between revisions of "Talk:Degenerate elliptic equation"

From Encyclopedia of Mathematics

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:The Soviet tradition was to denote the matrix with elements $a_{ij}$ by $\|a_{ij}\|$, sometimes with explicit indication of the limits, $\|a_{ij}\|_{i,j=1}^n$. As far as I am aware, the Western style allows both bracketed forms, $(a_{ij})$ and $[a_{ij}]$. In case of potential confusion, I would add the limits to dispel the ambiguity. -- [[User:Yakovenko|Sergei Yakovenko]] 08:27, 3 May 2012 (CEST) | :The Soviet tradition was to denote the matrix with elements $a_{ij}$ by $\|a_{ij}\|$, sometimes with explicit indication of the limits, $\|a_{ij}\|_{i,j=1}^n$. As far as I am aware, the Western style allows both bracketed forms, $(a_{ij})$ and $[a_{ij}]$. In case of potential confusion, I would add the limits to dispel the ambiguity. -- [[User:Yakovenko|Sergei Yakovenko]] 08:27, 3 May 2012 (CEST) | ||

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+ | :: Thank you Sergei, one learns something new every day! I think that the present form (without the explicit indices) is sufficiently common in the West that no confusion will arise. |

## Latest revision as of 08:43, 3 May 2012

Post-$\TeX$ notes

- I have replaced the $\left\|\cdot\right\|$ on the final line by a $[\cdot]$, since the former seemed to me to be a typo, DE experts please check this ...

--Jjg 00:21, 3 May 2012 (CEST)

- The Soviet tradition was to denote the matrix with elements $a_{ij}$ by $\|a_{ij}\|$, sometimes with explicit indication of the limits, $\|a_{ij}\|_{i,j=1}^n$. As far as I am aware, the Western style allows both bracketed forms, $(a_{ij})$ and $[a_{ij}]$. In case of potential confusion, I would add the limits to dispel the ambiguity. -- Sergei Yakovenko 08:27, 3 May 2012 (CEST)

- Thank you Sergei, one learns something new every day! I think that the present form (without the explicit indices) is sufficiently common in the West that no confusion will arise.

**How to Cite This Entry:**

Degenerate elliptic equation.

*Encyclopedia of Mathematics.*URL: http://encyclopediaofmath.org/index.php?title=Degenerate_elliptic_equation&oldid=25870