Difference between revisions of "Testing Area"
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| − | + | Is the fricking equation support working properly? | |
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| + | <math>T_a T_b = \frac{1}{2n}\delta_{ab}I_n + \frac{1}{2}\sum_{c=1}^{n^2 -1}{(if_{abc} + d_{abc}) T_c} \,</math> | ||
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| + | HELL YEAH! | ||
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| + | <math>H^k(X, \mathbf{C}) = \bigoplus_{p+q=k} H^{p,q}(X),</math> | ||
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| + | Navier Stokes: | ||
| + | * There exists a constant <math>E\in (0,\infty)</math> such that <math>\int_{\mathbb{T}^3} \vert \mathbf{v}(x,t)\vert dx <E</math> for all <math>t\ge 0\,.</math> | ||
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| + | [http://www.andy-roberts.net/misc/latex/latextutorial9.html Equation Tutorial] | ||
Latest revision as of 06:22, 24 November 2010
Is the fricking equation support working properly?
<math>T_a T_b = \frac{1}{2n}\delta_{ab}I_n + \frac{1}{2}\sum_{c=1}^{n^2 -1}{(if_{abc} + d_{abc}) T_c} \,</math>
HELL YEAH!
<math>H^k(X, \mathbf{C}) = \bigoplus_{p+q=k} H^{p,q}(X),</math>
Navier Stokes:
- There exists a constant <math>E\in (0,\infty)</math> such that <math>\int_{\mathbb{T}^3} \vert \mathbf{v}(x,t)\vert dx <E</math> for all <math>t\ge 0\,.</math>
