User contributions for LaSTLeGioNTR

28 November 2019

• 19:1619:16, 28 November 2019 diff hist +10‎ Definition:Producer of Dedekind Cut ‎No edit summary
• 19:1419:14, 28 November 2019 diff hist −4‎ Definition:Producer of Dedekind Cut ‎No edit summary
• 19:1319:13, 28 November 2019 diff hist +12‎ Dedekind's Theorem ‎No edit summary
• 19:1319:13, 28 November 2019 diff hist −193‎ Dedekind's Theorem ‎No edit summary
• 19:0419:04, 28 November 2019 diff hist +173‎ Definition:Producer of Dedekind Cut ‎No edit summary
• 19:0119:01, 28 November 2019 diff hist 0‎ Producer of Dedekind Cut/Examples ‎No edit summary
• 19:0019:00, 28 November 2019 diff hist +2‎ Producer of Dedekind Cut/Examples ‎No edit summary
• 19:0019:00, 28 November 2019 diff hist +303‎ N Producer of Dedekind Cut/Examples/sqrt2 ‎ Created page with "== Examples of Producers of Dedekind Cuts == <onlyinclude> Let $L = \{l\in\Q: l < \sqrt{2}\}$ and $R = \{r\in\Q: \sqrt{2}<r\}$. Then $..."
• 18:5918:59, 28 November 2019 diff hist +276‎ N Producer of Dedekind Cut/Examples/2 ‎ Created page with "== Examples of Producers of Dedekind Cuts == <onlyinclude> Let $L = \{l\in\Q: l \leq 2\}$ and $R = \{r\in\Q: 2<r\}$. Then $(L, R)$ is..."
• 18:5818:58, 28 November 2019 diff hist +374‎ N Producer of Dedekind Cut/Examples ‎ Created page with "== Examples of Producers of Dedekind Cuts == <onlyinclude> === Example: 2 === {{:D..."
• 18:3318:33, 28 November 2019 diff hist +334‎ N Definition:Producer of Dedekind Cut ‎ Created page with "== Definition == Let $\struct {S, \preceq}$ be a totally ordered set and $S'\subseteq S$. Let $(L,R)$ be a Definition:Dedekind_Cut| dedek..."
• 08:4908:49, 28 November 2019 diff hist 0‎ User talk:LaSTLeGioNTR ‎No edit summary current
• 08:4108:41, 28 November 2019 diff hist −8‎ User talk:LaSTLeGioNTR ‎No edit summary
• 08:4008:40, 28 November 2019 diff hist +557‎ User talk:LaSTLeGioNTR ‎No edit summary

27 November 2019

• 20:4820:48, 27 November 2019 diff hist −739‎ Dedekind's Theorem ‎No edit summary

22 November 2019

• 08:0108:01, 22 November 2019 diff hist 0‎ Hartogs' Lemma (Set Theory)/Proof 1 ‎No edit summary