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Revision as of 18:53, 2 December 2010

The sandbox is the page where you can experiment with the wiki syntax. Feel free to write nonsense or clear the page whenever you want.

1 Images

some text

a line break

some text again

a big line break.

$ == Images == <wikitex>; some text a line break some text again a big line break. $\Ker$ $\mathscr{A}$ $\mathscr{B}$ \bf{ bold} \it{italic} \em{emphasis} </wikitex> [[Image:Foliation.png|thumb|300px|3-dimensional Reeb foliation]] == Tests == {{citeD|Ranicki1981}} <wikitex>; {{beginproof}} {{endproof}} </wikitex> [[Media:frog.pdf|frog]] == Section == === Subsection === \label{subsection} Refert to subsection \ref{subsection} \begin{theorem} test \end{theorem} \label{thm} Refer to theorem \ref{thm} == Section == <wikitex>; An [[map-eds:Manifold Atlas:Projects in the Atlas|inter-Wiki link]]. Another<ref>Test</ref> [[map-eds:Manifold Atlas:Projects in the Atlas|inter-Wiki link]]. </wikitex> sdfasdfa dfa<ref>Test</ref> sdfasf <wikitex>; {{ref|abs}} Poincare complexes are great: $$ H_i(X) \cong H^{n-i}(X)$$ $$ \oplus, \bigoplus $$ </wikitex> ==Footnotes== <references/> == Images == <wikitex>; some text a line break some text again a big line break. $\Ker$ $\mathscr{A}$ $\mathscr{B}$ \bf{ bold} \it{italic} \em{emphasis} </wikitex> [[Image:Foliation.png|thumb|300px|3-dimensional Reeb foliation]] == Tests == {{citeD|Ranicki1981}} <wikitex>; {{beginproof}} {{endproof}} </wikitex> [[Media:frog.pdf|frog]] == Section == === Subsection === \label{subsection} Refert to subsection \ref{subsection} \begin{theorem} test \end{theorem} \label{thm} Refer to theorem \ref{thm} == Section == <wikitex>; An [[map-eds:Manifold Atlas:Projects in the Atlas|inter-Wiki link]]. Another<ref>Test</ref> [[map-eds:Manifold Atlas:Projects in the Atlas|inter-Wiki link]]. </wikitex> sdfasdfa dfa<ref>Test</ref> sdfasf <wikitex>; {{ref|abs}} Poincare complexes are great: $$ H_i(X) \cong H^{n-i}(X)$$ $$ \oplus, \bigoplus $$ </wikitex> ==Footnotes== <references/>\Ker$

$\mathscr{A}$ $\mathscr{B}$

bold italic emphasis

File:Foliation.png

3-dimensional Reeb foliation

2 Tests

[Ranicki1981]

Proof.

$\square$ $\square$

frog

3 Section

3.1 Subsection

Refert to subsection 3.1

Theorem 3.1. test

Refer to theorem 3.1

4 Section

An inter-Wiki link.

Another^[1]; inter-Wiki link.

sdfasdfa dfa^[2] sdfasf

Template:Ref Poincare complexes are great:

$\displaystyle H_i(X) \cong H^{n-i}(X)$ $\displaystyle H_i(X) \cong H^{n-i}(X)$

$\displaystyle \oplus, \bigoplus$ $\displaystyle \oplus, \bigoplus$

5 Footnotes

↑ Test
↑ Test

[0] Test

[1] Test

[1]

[2]

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Revision as of 18:53, 2 December 2010

Contents

1 Images

2 Tests

3 Section

3.1 Subsection

4 Section

5 Footnotes

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@@ Line 4: / Line 4: @@
 <wikitex>;
-$\Ker$
+some text
-$\mathscr{A}$ $\mathscr{B}$
+a line break
-\bf{ bold}  \it{italic} \em{emphasis}
+some text again
-</wikitex>
-[[Image:Foliation.png|thumb|300px|3-dimensional Reeb foliation]]
+a big line break.
-== Fonts ==
+$\Ker$
- <wikitex refresh include="MediaWiki:MathFontCM">;
-$a > b < c$
-CM: The connected sum of $\RP^2$ with $T^2ZZZ$ is homeomorphic to $\RP^2\mathbin{\sharp}\RP^2\mathbin{\sharp}\RP^2X$.
-</wikitex>
-<wikitex refresh include="MediaWiki:MathFontHV">;
+$\mathscr{A}$ $\mathscr{B}$
-HV: The connected sum of $\RP^2$ with $T^2XXX$ is homeomorphic to $\RP^2\mathbin{\sharp}\RP^2\mathbin{\sharp}\RP^2Y$.
-</wikitex>
-<wikitex refresh include="MediaWiki:MathFontLM">;
+\bf{ bold}  \it{italic} \em{emphasis}
-LM: The connected sum of $\RP^2$ with $T^2YYYY$ is homeomorphic to $\RP^2\mathbin{\sharp}\RP^2\mathbin{\sharp}\RP^2Z$.
-</wikitex>
-<wikitex refresh include="MediaWiki:MathFont">;
-MF: The connected sum of $\RP^2$ with $T^2VVVV$ is homeomorphic to $\RP^2\mathbin{\sharp}\RP^2\mathbin{\sharp}\RP^2ZZ$.
 </wikitex>
-<wikitex refresh>;
+[[Image:Foliation.png|thumb|300px|3-dimensional Reeb foliation]]
-The connected sum of $\RP^2$ with $T^2$ is homeomorphic to $\RP^2\mathbin{\sharp}\RP^2\mathbin{\sharp}\RP^2ZZZ$.
-</wikitex>
 == Tests ==