# MC Integration ## Classical Monte Carlo Integration [Robert and Casella (2013)](https://www.springer.com/gp/book/9781475730715) introduces the classical Monte Carlo integration: ![](/files/-LKpSRNiaTJ1_q9CwinA) ## Toy Example 为了计算积分 ![](https://latex.codecogs.com/gif.latex?I%20%3D%20\int%20_D%20g$\mathbf%20x$d\mathbf%20x) 我们通常采用MC模拟: 1. 计算区域的volume：![](https://latex.codecogs.com/gif.latex?V%20%3D%20\int_D%20d\mathbf%20x) 2. 近似：![](https://latex.codecogs.com/gif.latex?\hat%20I_m%3DV\frac{1}{m}\sum\limits_{i%3D1}^mg$\mathbf%20x^{\(m$}\)) 根据大数律有 ![](https://latex.codecogs.com/gif.latex?\lim_{m\rightarrow%20\infty}%20\hat%20I_m%3DI) 并且由中心极限定理有 ![](https://latex.codecogs.com/gif.latex?\frac{1}{V}{}\sqrt{m}$\hat%20I_m-I$\rightarrow%20N$0%2C%20\sigma^2$) 其中![](https://latex.codecogs.com/gif.latex?\sigma^2%3Dvar$g\(\mathbf%20x$\)) 另外，注意到 $$ I = \int\_Dg(\mathbf x)d\mathbf x = \int\_D Vg(\mathbf x)\frac 1V d\mathbf x = {\mathbb E}\_f\[Vg(\mathbf x)], $$ 则可以直接利用上一节的结论。 ```r ## estimate pi ## ## I = \int H(x, y)dxdy ## where H(x, y) = 1 when x^2+y^2 <= 1; ## otherwise H(x, y) = 0 ## volume V = 4 n = 100000 x = runif(n, -1, 1) y = runif(n, -1, 1) H = x^2+y^2 H[H<=1] = 1 H[H>1] = 0 I = V* mean(H) cat("I = ", I, "\n") ## n = 100, I = 2.96 ## n = 1000, I = 3.22 ## n = 10000, I = 3.1536 ## n = 100000, I = 3.14504 ``` ## Polar Simulation **Note:** Unless otherwise stated, the algorithms and the corresponding screenshots are adopted from [Robert and Casella (2013)](https://www.springer.com/gp/book/9781475730715). ![](/files/-LKMsLEeSF7XE9PMfmNF) ![](/files/-LKMsLEgZXntbVr41_Yg) The following Julia program can be used to do polar simulation. ```julia using Statistics function polarsim(x::Array) while true phi1 = rand()*2*pi phi2 = rand()*pi - pi/2 u = rand() xdotxi = x[1]*cos(phi1) + x[2]*sin(phi1)*cos(phi2) + x[3]*sin(phi1)*sin(phi2) if u <= exp(xdotxi - sum(x.^2)/2) return(randn() + xdotxi) end end end # approximate E^pi function Epi(m, x = [0.1, 1.2, -0.7]) rhos = ones(m) for i = 1:m rhos[i] = 1/(2*polarsim(x)^2+3) end return(mean(rhos)) end # example Epi(10) ``` --- # Agent Instructions: Querying This Documentation If you need additional information that is not directly available in this page, you can query the documentation dynamically by asking a question. Perform an HTTP GET request on the current page URL with the `ask` query parameter: ``` GET https://mc.hohoweiya.xyz/mcintegration.md?ask= ``` The question should be specific, self-contained, and written in natural language. The response will contain a direct answer to the question and relevant excerpts and sources from the documentation. Use this mechanism when the answer is not explicitly present in the current page, you need clarification or additional context, or you want to retrieve related documentation sections.