- 17:22, 28 July 2009 (diff | hist) . . (+1) . . The Pirate's Booty
- 17:20, 28 July 2009 (diff | hist) . . (-3) . . The Pirate's Booty
- 17:19, 28 July 2009 (diff | hist) . . (+3) . . The Pirate's Booty
- 17:18, 28 July 2009 (diff | hist) . . (0) . . The Pirate's Booty
- 17:18, 28 July 2009 (diff | hist) . . (0) . . The Pirate's Booty
- 17:18, 28 July 2009 (diff | hist) . . (+34) . . The Pirate's Booty
- 17:17, 28 July 2009 (diff | hist) . . (+2,273) . . N Number 4, shiver me timbers! (New page: 4. Suppose that <math> G: [0,1] \times [0,1] \longrightarrow \mathbb{R} </math> is continuous. For <math> f \in L^2([0,1]) </math>, and <math> x \in [0,1] </math>, let <math> (Tf)(x) := \...)
- 17:12, 5 July 2009 (diff | hist) . . (+16) . . 4.4 MA598R (current)
- 08:12, 5 July 2009 (diff | hist) . . (+17) . . MA 598R pweigel Summer 2009 Lecture 4
- 08:11, 5 July 2009 (diff | hist) . . (+43) . . 4.4 MA598R
- 08:10, 5 July 2009 (diff | hist) . . (+791) . . N 4.4 MA598R (New page: Let <math> f </math> be a non-negative measurable function on <math> \mathbb{R} </math>. Prove that if <math> \sum_{n=-\infty}^{\infty} f(x+n) </math> is integrable, then <math> f=0 </ma...)
