标签:ams package pack use 特殊字符 bsp sig nbsp rac
\$w(t) \longrightarrow \bigg[\frac{\sqrt{2\sigma ^2\beta}}{s+\beta}\bigg] \longrightarrow \bigg[\frac{1}{s}\bigg] \longrightarrow y\$
$w(t) \longrightarrow \bigg[\frac{\sqrt{2\sigma ^2\beta}}{s+\beta}\bigg] \longrightarrow \bigg[\frac{1}{s}\bigg] \longrightarrow y$
\usepackage{amsmath} %可以使用\boldsymbol加粗罗马字符;\mathbf对罗马字符不起作用。
\$\mathbf{x}_{k+1} = \boldsymbol{\phi}_k \mathbf{x}_k + \mathbf{w}_k\$
$\mathbf{x}_{k+1} = \boldsymbol{\phi}_k \mathbf{x}_k + \mathbf{w}_k$
%注意{和}是特殊字符,使用\{和\}
\$\mathbf{Q}_k=E[\mathbf{w}_k\mathbf{w}_k^T]\$
\$=E\big\{ \big[ \int_{t_k}^{t_{k+1}} \boldsymbol{\phi}(t_{k+1}, u) \mathbf{G}(u) \mathbf{w}(u)du \big] \big[ \int_{t_k}^{t_{k+1}}\boldsymbol{\phi}(t_{k+1},v) \mathbf{G}(v) \mathbf{w}(v)dv \big]^T \big\}\$
\$=\int_{t_k}^{t_{k+1}} \int_{t_k}^{t_{k+1}} \boldsymbol{\phi}(t_{k+1}, u)\mathbf{G}(u)E[\mathbf{w}(u)\mathbf{w}^T(v)]\mathbf{G}^T(v)\boldsymbol{\phi}^T(t_{k+1},v)dudv\$
$\mathbf{Q}_k=E[\mathbf{w}_k\mathbf{w}_k^T]$
$=E\big\{ \big[ \int_{t_k}^{t_{k+1}} \boldsymbol{\phi}(t_{k+1}, u) \mathbf{G}(u) \mathbf{w}(u)du \big] \big[ \int_{t_k}^{t_{k+1}}\boldsymbol{\phi}(t_{k+1},v) \mathbf{G}(v) \mathbf{w}(v)dv \big]^T \big\}$
$=\int_{t_k}^{t_{k+1}} \int_{t_k}^{t_{k+1}} \boldsymbol{\phi}(t_{k+1}, u)\mathbf{G}(u)E[\mathbf{w}(u)\mathbf{w}^T(v)]\mathbf{G}^T(v)\boldsymbol{\phi}^T(t_{k+1},v)dudv$
标签:ams package pack use 特殊字符 bsp sig nbsp rac
原文地址:http://www.cnblogs.com/byeyear/p/6682053.html
