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Rosa edited untitled.tex about 8 years ago

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\end{eqnarray} We now compute separately the different parts of the previous expression for the ac noise \begin{eqnarray} S^{>,1}(\omega)= \frac{e^2}{\hbar^2} \frac{1}{2\pi}\int_{-\infty}^\infty d\epsilon \frac{e^2}{\hbar^2}\int_{-\infty}^\infty \frac{d\epsilon}{2\pi} \sum_{k,q,p\beta\gamma\alpha\delta} G^r_{\beta \alpha}(\epsilon) [V^*_{p\alpha} g^<_{p}(\omega)V_{p\delta} + V_{p\alpha} g^{h,<}_{p}(\omega) V^*_{k\delta}]G^a_{\delta \gamma}(\epsilon) g_{q}^{h,<}(\omega+\epsilon)\delta_{kq} \end{eqnarray} \begin{eqnarray} S^{>,2}(\omega)= \frac{e^2}{\hbar^2} \frac{1}{2\pi}\int_{-\infty}^\infty d\epsilon \int_{-\infty}^\infty \frac{d\epsilon}{2\pi} \sum_{k,q,p\beta\gamma\alpha\delta} G^r_{\beta \alpha}(\epsilon) [V^*_{p\alpha} g^<_{p}(\epsilon)V_{p\delta} + V_{p\alpha} g^{h,<}_{p}(\epsilon) V^*_{p\delta}]G^a_{\delta \gamma}(\epsilon) [g_{k}^{h,r}(\omega+\epsilon) V_{\gamma k} G^{<}_{\gamma\beta}(\omega+\epsilon)V_{\beta q}^* g_{q}^{h,a}(\omega+\epsilon)] \end{eqnarray} \begin{eqnarray} S^{>,3}(\omega)= \frac{e^2}{\hbar^2} \frac{1}{2\pi}\int_{-\infty}^\infty d\epsilon \int_{-\infty}^\infty \sum_{k,q,p\beta\gamma\alpha\delta} G^r_{\beta \alpha}(\epsilon) [V^*_{p\alpha} g^<_{p}(\epsilon)V_{p\delta} + V_{p\alpha} g^{h,<}_{p}(\epsilon) V^*_{p\delta}]G^a_{\delta \gamma}(\epsilon) [g_{k}^{h,r}(\omega+\epsilon) V_{\gamma k} G^{<}_{\gamma\beta}(\omega+\epsilon)V_{\beta q}^* g_{q}^{h,a}(\omega+\epsilon)] \end{eqnarray} \begin{eqnarray} S^{>,4}(\omega)= \frac{e^2}{\hbar^2} \frac{1}{2\pi}\int_{-\infty}^\infty d\epsilon \int_{-\infty}^\infty \frac{d\epsilon}{2\pi} \sum_{k,q,p\beta\gamma\alpha\delta} G^r_{\beta \alpha}(\epsilon) [V^*_{p\alpha} g^<_{p}(\epsilon)V_{p\delta} + V_{p\alpha} g^{h,<}_{p}(\epsilon) V^*_{p\delta}]G^a_{\delta \gamma}(\epsilon)[g_{k}^{h,<}(\omega+\epsilon) V_{\gamma k} G^{a}_{\gamma\beta}(\omega+\epsilon)V_{\beta q}^* g_{q}^{h,a}(\omega+\epsilon)] \end{eqnarray}