# Stochastic spread method for pairs trading by Elliot et. al (2005) - Kalman filter + EM algorithm in MATLAB, am I doing something wrong?

I am implementing the Stochastic spread method for pairs trading by Elliott et. al (2005).

The procedure consists of modeling the spread between two stocks, log(P1)-log(P2), as a mean reverting process, calibrated from market observations.

The hidden state process for the spread can be written like this:

x_{t+1} = A + Bx_t + Ce_{t+1}

The observation process is:

y_t = x_t + D*w_t

Both e_t and w_t are i.i.d. Gauusian N(0,1).

Elliott gives the Kalman filter equations in his paper, which I have implemented in my code for the updating step:

``````function [xt_t,st_t,xt_tm,kt,st_tm]=EMupdate(DATA_t,xt_t_m1,st_t_m1,A,B,C2,D2)
st_tm=B^2*st_t_m1+C2;
kt=st_tm/(st_tm+D2);
xt_tm=A+B*xt_t_m1;
xt_t=xt_tm+kt*(DATA_t-xt_tm);
st_t=st_tm-kt*st_tm;
``````

where

`xt_t` is `x_{t|t}`

`xt_t_m1` is `x_{t-1|t-1}`

`xt_tm` is `x_{t|t-1}`

`st_t` is `s_{t|t}` (the MSE, denoted as P in e.g. Hamilton (1994))

`st_t_m1` is `s_{t-1|t-1}`

`st_tm` is `s_{t|t-1}`

`kt` is the kalman gain for time t

`DATA_t` is the observed data for time t, `y_t`

`A`, `B`, `C2`, `D2` are the estimated parameters (which I have estimated using the EM algorithm in another code).

This update step is done every time a new data point arrives. I am storing all the x's, s's and k's in vectors. I am supposed to compare `y_t` with `x_{t|t-1}`, and given a large deviation of the two, a trade should be initiated. However, the two follows each other very closely, and I am unsure whether I have done something wrong:

Can someone see if I am doing wrong? Please tell me if I should link more of my code.

UPDATE: My procedure: (P is the same as s above)

1. To generate the spread between two stocks, I take the difference between the log-prices: y=log(p1)-log(p2).

2. I set a training period of 252 days, where I estimate the initial parameters (`A`, `B`, `C2` and `D2`) using the EM algorithm. I implement the EM algorithm using all the data for the training period; that is y(1), y(2), ..., y(252) as well as initial guesses for `A`, `B`, `C2` and `D2`:

2a. I set `x_{1|1}=y(1)`. Furthermore I set the MSE, `P_{1|1}=D2`, my initial guess for D^2.

2b. I recursively calculate Kalman filters, x_{t|t}, x_{t+1|t}, P_{t|t}, P_{t+1|t} and k_{t} for all t=1...252 (the entire training period) using my initial guesses for `A`, `B`, `C2` and `D2`.

2c. After I have calculated the kalman filters for the entire training period, I (backward) recursively calculate Kalman smoothers for the entire training period as well: t=1...252. These are `x_{t|T}`, `P_{t|T}`, `P_{t,t-1|T}` and `j_{t}`.

I then compute the log-likelihood value and the updated values for `A`, `B`, `C2` and `D2`. Then I repeat the steps from 1 until the log-likelihood converges and I obtain optimal values for `A`, `B`, `C2` and `D2`.

Is it correct to calculate Kalman filters for the entire training period before starting to calculate Kalman smoothers? Or should I, for example, calculate Kalman filters up till t=2, then Kalman smoothers for T=2, then Kalman filters up till t=3, then smoothers for T=3 etc.?

1. Now I have values for `A`, `B`, `C2` and `D2` and can begin my testperiod, also 252 days. I don't update my estimates for `A`, `B`, `C2` and `D2`, but keep them constant. For each new observation I can compute Kalman filters (the same as in 2b). Finally I can compare `y(t)` to x`_{t|t-1}` for the training period.

My results look like this:

While a paper by Chen, Ren and Lu have the following results:

NB: Not the same security... but the difference is obvious nonetheless.

• How large is kt? I think it has quite a high value (numerical). Which happens because of C2 and D2 (I assume these are the noise covariance matrices). Commented Apr 2, 2015 at 12:53
• It seems you're too confident on your measurements. You might want to increase D2 (a larger variance for measurement noise). That will trigger a lower kt. Commented Apr 2, 2015 at 12:58
• I am screening a lot of stock pairs, but kt seems to be between 0.7 and 1.0 for the absolute majority of pairs. Furthermore, kt converges to a constant value extremely fast. As mentioned, I am using the EM algorithm to find the values of A, B, C^2 and D^2, and for this I am using a training period of a year (252 daily data points). Within the first 3-4 observations, kt has converged to a constant value. Commented Apr 3, 2015 at 9:06
• The estimated C^2 lies between 0.0002 and 0.007, while the estimated D^2 lies between 0.000003 and 0.001. These are indeed the variances of the noise parameters. Commented Apr 3, 2015 at 9:11
• I am just having trouble figuring out if I am doing something wrong with respect to estimating the variances... I tried simulating data from an Ornstein-Uhlenbeck process and estimating the parameters using my EM code, and it caught the true values pretty well. Commented Apr 3, 2015 at 9:13