Difference between revisions of "Main Page"
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| − | Next, when studying differential equations we often work with the following subsets of $\ | + | Next, when studying differential equations we often work with the following subsets of $\mathcal{F}[0,L]$. |
$\mathcal{C}[0,L] = \{f\in \mathcal{F}[0,L] \,|\, f\; \text{continuous} \}$ is the set of functions $f: [0,L]\to\R$ that are continuous. | $\mathcal{C}[0,L] = \{f\in \mathcal{F}[0,L] \,|\, f\; \text{continuous} \}$ is the set of functions $f: [0,L]\to\R$ that are continuous. | ||
Revision as of 08:27, 18 May 2017
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Content Ideas
- links to polyfold talks .. IHES .. IAS
- annotated list of references
- space for conference/workshop announcements - such as SFT 9 in Augsburg
- ?? rather than Katrin (eventually) whipping up a separate polyfold lab page, maybe make a list of "polyfold people" with pictures and links to their personal websites/papers, space to state research interests ("contact me if ... ") .. include Wysocki memorial
- Helmut was talking about making his own wiki out of "the book" ... so eventually link there (or have a separate part) ... in any case, we'll need to clearly separate rigorous presentation (parts of the book etc) from Fukaya-category work in progress
Testing
![Next,whenstudyingdifferentialequationsweoftenworkwiththefollowingsubsetsof\${\mathcal {F}}[0,L]\$.\${\mathcal {C}}[0,L]=\{f\in {\mathcal {F}}[0,L]\,|\,f\;{\text{continuous}}\}\$isthesetoffunctions\$f:[0,L]\to \mathbb{R} \$thatarecontinuous.\${\mathcal {C}}^{\infty }[0,L]=\{f\in {\mathcal {F}}[0,L]\,|\,f\;{\text{smooth}}\}\$isthesetoffunctions\$f:[0,L]\to \mathbb{R} \$thataresmooth.Thatis,allderivativesof\$f\$arerequiredtobecontinuous.](/images/math/b/3/3/b330e76cf8d28596ea7bc486580248bb.png)
