# Fixed timestep loop in C++

I am trying to implement a fixed timestep loop so that the game refreshes at a constant rate. I found a great article at http://gafferongames.com/game-physics/fix-your-timestep/ but am having trouble translating that into my own 2d engine.

The specific place I am referring to is the function in the last part "The Final Touch" which is what most people recommend. This is his function:

double t = 0.0;
const double dt = 0.01;

double currentTime = hires_time_in_seconds();
double accumulator = 0.0;

State previous;
State current;

while ( !quit )
{
double newTime = time();
double frameTime = newTime - currentTime;
if ( frameTime > 0.25 )
frameTime = 0.25;   // note: max frame time to avoid spiral of death
currentTime = newTime;

accumulator += frameTime;

while ( accumulator >= dt )
{
previousState = currentState;
integrate( currentState, t, dt );
t += dt;
accumulator -= dt;
}

const double alpha = accumulator / dt;

State state = currentState*alpha + previousState * ( 1.0 - alpha );

render( state );
}

For myself, I am just moving a player across the screen keeping track of an x and y location as well as velocity rather than doing calculus integration. **I am confused as to what I would apply to the updating of the player's location (dt or t?). Can someone break this down and explain it further?

The second part is the interpolation which I understand as the formula provided makes sense and I could simply interpolate between the current and previous x, y player positions.

Also, I realize I need to get a more accurate timer.

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That function is for the integral from calculus. You seem to be asking about a timer event. These have nothing to do with each other. –  chrisaycock May 7 '12 at 4:02
@chrisaycock sorry for the confusion. question updated. –  Pladnius Brooks May 7 '12 at 4:13
You certainly are confused, since you are doing integration but you say you're not doing integration. Yes, the integration from elementary calculus. –  Dietrich Epp May 7 '12 at 4:28

The function is a numerical technique (2nd link) for approximating the integral function (1st link).

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This needs to be a comment. –  chrisaycock May 7 '12 at 4:02
Sorry, I updated my question. I worded it badly. I was wondering how the main function was using time and delta time and how I would apply it to the moving of a 2d player with an x and y position. –  Pladnius Brooks May 7 '12 at 4:12
@chrisaycock I disagree. It answered the question as originally stated. Also, SO will not let me post comments--only answers. –  johanatan May 7 '12 at 4:48
@pladnius Ahhh. –  johanatan May 7 '12 at 4:49
@JonathanLeonard: answers that only contain links are frown upon. You need to provide a real answer and use the links as references to support your claims or provide further explanations. –  Matthieu M. May 7 '12 at 8:58

If you can get at least microsecond accuracy, try this:

long int start = 0, end = 0;
double delta = 0;
double ns = 1000000.0 / 60.0; // Syncs updates at 60 per second (59 - 61)
while (!quit) {
start = timeAsMicro();
delta+=(double)(start - end) / ns;
end = start;

while (delta >= 1.0) {