RobertJasiek wrote:Bill Spight wrote:We do not know the temperature of the empty 19x19 board, but, based on a komi of 7, we can guess that it is around 14.
Why twice the komi value? Are you speaking of local temperature here? This would express the per move value (miai value). I thought that it would be one time the komi value.
Suppose the game would be over after just one play. Since the komi is supposed to be fair, the score must be 0 then. 7 komi points for White versus 7 points for Black gained by the one play. That is, the per move value was 7 points - not 14.
What do I not understand?
Why twice the komi value? There are two extremes. One extreme is that the first play is the last effective play (as with the 3x3 and 5x5 boards). In that case the komi (starting from an empty board) is how much the first play gains (the temperature). The other extreme is that the game is miai, with a score of 0. That leads to an estimate of komi as half the temperature.
Edit:
The error, of course, is rather large. On the 19x19, however, the estimate of the value of sente as one half the temperature is quite good. The main reason is that the temperature drop between plays is normally small. Let us assume that komi is a proportion of the temperature, and that the temperature drop is small. I. e.,
k(t) = s(t) = a*t
The komi when the temperature is t equals the value of sente when the temperature is t, which equals a times t.
k(t0) = t0 - s(t1)
The komi when the temperature is t0 equals t0 minus the value of sente for the new temperature, t1.
a*t0 = t0 - a*t1
By substitution
a*t1 = (1-a)*t0
a/(1-a) = t0/t1
If the drop in temperature is small, then t0 approximately equals t1, and so a/(1-a) approximately equals 1, and so a approximately equals 1/2.
