| Name | Size | Creator | Creation Date | Labels | Comment | ||
|---|---|---|---|---|---|---|---|
| PNG File 0b7bf42db84e4d2dbb7bf55476c12bf9f6233bc5.png | 0.3 kB | Brandon Carl | Nov 21, 2012 17:50 |
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$\mathcal{A}$ | ||
| Version 1 (current) | 0.3 kB | Brandon Carl | Nov 21, 2012 17:50 | $\mathcal{A}$ | |||
| PNG File f3e830722dede854af533bfa96d549c68ed5997f.png | 0.3 kB | Brandon Carl | Nov 21, 2012 17:50 |
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$\mathbf{A}$ | ||
| Version 1 (current) | 0.3 kB | Brandon Carl | Nov 21, 2012 17:50 | $\mathbf{A}$ | |||
| PNG File bc7aa077d968e9fb05ef520d9c4c39c501c2130c.png | 2 kB | Brandon Carl | Nov 21, 2012 17:50 |
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\(\left[{\bf X} + {\rm a} \ \geq\ \underline {\hat a} \sum_i^N \lim_{x \rightarrow k} \delta C\right]\) | ||
| Version 1 (current) | 2 kB | Brandon Carl | Nov 21, 2012 17:50 | \(\left[{\bf X} + {\rm a} \ \geq\ \underline {\hat a} \sum_i^N \lim_{x \rightarrow k} \delta C\right]\) | |||
| PNG File 640795ad5fbbe60e1122ca2d2c8a24acf56d7cf1.png | 3 kB | Brandon Carl | Nov 21, 2012 17:50 |
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\[z \left( 1 \ +\ \sqrt{\omega_{i+1} + \zeta -\frac{x+1}{\Theta +1} y + 1}\ \right)\ \ \ =\ \ \ 1\] | ||
| Version 1 (current) | 3 kB | Brandon Carl | Nov 21, 2012 17:50 | \[z \left( 1 \ +\ \sqrt{\omega_{i+1} + \zeta -\frac{x+1}{\Theta +1} y + 1}\ \right)\ \ \ =\ \ \ 1\] | |||
| PNG File 0273d10f7d2e4bc695a7f16e24acdd14fb5668b6.png | 1 kB | Brandon Carl | Nov 21, 2012 17:50 |
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\(\lambda _{0}=\Lambda _{0}\mathit{c}^{2}/(3\mathit{H}^{2}_{0}) \) | ||
| Version 1 (current) | 1 kB | Brandon Carl | Nov 21, 2012 17:50 | \(\lambda _{0}=\Lambda _{0}\mathit{c}^{2}/(3\mathit{H}^{2}_{0}) \) | |||
| PNG File 295d520fc805d1e5b40658b6a9127df8bb898d35.png | 0.7 kB | Brandon Carl | Nov 21, 2012 17:50 |
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E=mc^2 | ||
| Version 1 (current) | 0.7 kB | Brandon Carl | Nov 21, 2012 17:50 | E=mc^2 | |||
| PNG File 8dfe729bb188874096cf7a877142c225ba0c9ccb.png | 3 kB | Brandon Carl | Nov 21, 2012 17:50 |
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$\displaystyle 2 f(x) |\nabla|^\alpha f(x) - |\nabla|^\alpha ( f^2 )(x) = c(\alpha) \int_{{\mathbb R}^d} \frac{|f(x)-f(y)|^2}{|x-y|^{d+\alpha}}\ dy$ | ||
| Version 1 (current) | 3 kB | Brandon Carl | Nov 21, 2012 17:50 | $\displaystyle 2 f(x) |\nabla|^\alpha f(x) - |\nabla|^\alpha ( f^2 )(x) = c(\alpha) \int_{{\mathbb R}^d} \frac{|f(x)-f(y)|^2}{|x-y|^{d+\alpha}}\ dy$ | |||
| PNG File 69440208e932ea84a4e35e356871a115e2186f36.png | 3 kB | Brandon Carl | Nov 21, 2012 17:50 |
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$\displaystyle C_n \prod_{1 \leq i<j \leq n} |\lambda_i-\lambda_j|^2 \exp( - \frac{1}{2n} (\lambda_1^2+\ldots+\lambda_n^2))\ d\lambda_1 \ldots d\lambda_n$ | ||
| Version 1 (current) | 3 kB | Brandon Carl | Nov 21, 2012 17:50 | $\displaystyle C_n \prod_{1 \leq i<j \leq n} |\lambda_i-\lambda_j|^2 \exp( - \frac{1}{2n} (\lambda_1^2+\ldots+\lambda_n^2))\ d\lambda_1 \ldots d\lambda_n$ | |||
| PNG File 4573f914ddb636281d2bdd4c99592bd276635efe.png | 2 kB | Brandon Carl | Nov 21, 2012 17:50 |
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$\displaystyle \frac{1}{2\pi} (4-x^2)_+^{1/2}\ dx =: \rho_{sc}(x)\ dx$ | ||
| Version 1 (current) | 2 kB | Brandon Carl | Nov 21, 2012 17:50 | $\displaystyle \frac{1}{2\pi} (4-x^2)_+^{1/2}\ dx =: \rho_{sc}(x)\ dx$ | |||
| PNG File e13adbcea06cc056a828c387cf2a3e9959ea9449.png | 2 kB | Brandon Carl | Nov 21, 2012 17:50 |
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$\displaystyle \lambda_i(M_n) = \sqrt{n} t(\frac{i}{n}) + O( \frac{\log n}{n} )$ | ||
| Version 1 (current) | 2 kB | Brandon Carl | Nov 21, 2012 17:50 | $\displaystyle \lambda_i(M_n) = \sqrt{n} t(\frac{i}{n}) + O( \frac{\log n}{n} )$ | |||
| PNG File bc67a2db372a95aa9a0b69e391daa501d52add64.png | 2 kB | Brandon Carl | Nov 21, 2012 17:50 |
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$\displaystyle a = \int_{-2}^{t(a)} \rho_{sc}(x)\ dx$ | ||
| Version 1 (current) | 2 kB | Brandon Carl | Nov 21, 2012 17:50 | $\displaystyle a = \int_{-2}^{t(a)} \rho_{sc}(x)\ dx$ | |||
| PNG File a9a7c3e7792dfe03a9ba48c285325112021ad904.png | 2 kB | Brandon Carl | Nov 21, 2012 17:50 |
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$i\hbar\frac{\partial}{\partial t}\left|\Psi(t)\right>=H\left|\Psi(t)\right>$ | ||
| Version 1 (current) | 2 kB | Brandon Carl | Nov 21, 2012 17:50 | $i\hbar\frac{\partial}{\partial t}\left|\Psi(t)\right>=H\left|\Psi(t)\right>$ |
