# Kalman Filter implementation - what could be wrong

I am sorry for being this tedious but I reviewed my code several times with the help of a dozen of articles but still my KF doesn't work. By "doesn't work" I mean that the estimates by KF are wrong. Here is a nice paste of Real, Noised and KF estimated positions (just a small chunk).

My example is the same as in every tutorial I've found - I have a state vector of position and velocity. Position is in meters and represents vertical position in air. My real world case is skydiving (with parachute). In my sample generated data I've assumed we start at 3000m and the velocity is 10m/s.

P.S.: I am pretty sure matrix computations are OK - there must be an error with the logic.

Here I generate data:

``````void generateData(float** inData, float** noisedData, int x, int y){
inData[0][0]= 3000; //start position
inData[1][0]= -10; // 10m/s velocity; minus because we assume it's falling

noisedData[0][0]= 2998;
noisedData[1][0]= -10;

for(int i=1; i<x; i++){
inData[0][i]= inData[0][i-1] + inData[1][i-1];
inData[1][i]= inData[1][i-1]; //the velocity doesn't change for simplicity's sake

noisedData[0][i]=inData[0][i]+(rand()%6-3); //we add noise to real measurement
noisedData[1][i]=inData[1][i]; //velocity has no noise
}
}
``````

And this is my implementation (matrices initialization is based on Wikipedia Kalman example):

``````int main(int argc, char** argv) {
srand(time(NULL));

float** inData = createMatrix(100,2); //2 rows, 100 columns
float** noisedData = createMatrix(100,2);
float** estData = createMatrix(100,2);

generateData(inData, noisedData, 100, 2);

float sampleRate=0.1; //10hz

float** A=createMatrix(2,2);
A[0][0]=1;
A[0][1]=sampleRate;
A[1][0]=0;
A[1][1]=1;

float** B=createMatrix(1,2);
B[0][0]=pow(sampleRate,2)/2;
B[1][0]=sampleRate;

float** C=createMatrix(2,1);
C[0][0]=1; //we measure only position
C[0][1]=0;

float u=1.0; //acceleration magnitude
float accel_noise=0.2; //acceleration noise
float measure_noise=1.5; //1.5 m standard deviation
float R=pow(measure_noise,2); //measure covariance
float** Q=createMatrix(2,2); //process covariance
Q[0][0]=pow(accel_noise,2)*(pow(sampleRate,4)/4);
Q[0][1]=pow(accel_noise,2)*(pow(sampleRate,3)/2);
Q[1][0]=pow(accel_noise,2)*(pow(sampleRate,3)/2);
Q[1][1]=pow(accel_noise,2)*pow(sampleRate,2);

float** P=createMatrix(2,2); //covariance update
P[0][0]=0;
P[0][1]=0;
P[1][0]=0;
P[1][1]=0;

float** P_est=createMatrix(2,2);
P_est[0][0]=P[0][0];
P_est[0][1]=P[0][1];
P_est[1][0]=P[1][0];
P_est[1][1]=P[1][1];

float** K=createMatrix(1,2); //Kalman gain

float** X_est=createMatrix(1,2); //our estimated state
X_est[0][0]=3000; X_est[1][0]=10;

// !! KALMAN ALGORITHM START !! //
for(int i=0; i<100; i++)
{
float** temp;
float** temp2;
float** temp3;

float** C_trans=matrixTranspose(C,2,1);
temp=matrixMultiply(P_est,C_trans,2,2,1,2); //2x1
temp2=matrixMultiply(C,P_est,2,1,2,2); //1x2
temp3=matrixMultiply(temp2,C_trans,2,1,1,2); //1x1
temp3[0][0]+=R;
K[0][0]=temp[0][0]/temp3[0][0]; // 1. KALMAN GAIN
K[1][0]=temp[1][0]/temp3[0][0];

temp=matrixMultiply(C,X_est,2,1,1,2);
float diff=noisedData[0][i]-temp[0][0]; //diff between meas and est

X_est[0][0]=X_est[0][0]+(K[0][0]*diff);  // 2. ESTIMATION CORRECTION
X_est[1][0]=X_est[1][0]+(K[1][0]*diff);

temp=createMatrix(2,2);
temp[0][0]=1; temp[0][1]=0; temp[1][0]=0; temp[1][1]=1;
temp2=matrixMultiply(K,C,1,2,2,1);
temp3=matrixSub(temp,temp2,2,2,2,2);
P=matrixMultiply(temp3,P_est,2,2,2,2);  // 3. COVARIANCE UPDATE

temp=matrixMultiply(A,X_est,2,2,1,2);
X_est[0][0]=temp[0][0]+B[0][0]*u;
X_est[1][0]=temp[1][0]+B[1][0]*u; // 4. PREDICT NEXT STATE

temp=matrixMultiply(A,P,2,2,2,2);
float** A_inv=getInverse(A,2);
temp2=matrixMultiply(temp,A_inv,2,2,2,2);
P_est=matrixAdd(temp2,Q,2,2,2,2); // 5. PREDICT NEXT COVARIANCE

estData[0][i]=X_est[0][0]; //just saving here for later to write out
estData[1][i]=X_est[1][0];
}

for(int i=0; i<100; i++) printf("%4.2f  :  %4.2f  :  %4.2f \n", inData[0][i], noisedData[0][i], estData[0][i]); // just writing out

return (EXIT_SUCCESS);
}
``````
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I won't attempt to answer this, but is it correct to assume the `-m/s`. I see what your getting at with the object falling, but does the continued equations realize that? Would it be better to keep it positive and subtract it where need be? Curious! –  BobbyDigital Aug 10 '12 at 11:11
I tried that - it's the same! :) –  Primož 'c0dehunter' Kralj Aug 10 '12 at 11:13
I figured as much:) –  BobbyDigital Aug 10 '12 at 11:14

You are doing a lot of weird array indexing.

``````float** A=createMatrix(2,2);
A[0][0]=1;
A[0][3]=sampleRate;
A[1][0]=0;
A[1][4]=1;
``````

What is the expected outcome of indexing outside of the bounds of the array?

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I don't know where that numbers came from. In my code everything is alright. I've fixed it here too. –  Primož 'c0dehunter' Kralj Aug 10 '12 at 11:16