# Upper Confidence Bounds in Monte Carlo Tree Search when plays or visited are 0

I'm looking at the 'Upper Confidence Bounds' calculation as it appears in the 'Monte Carlo Tree Search' algorythm and I've hit upon a problem.

``````log is the natural log.
C is a weight for exploration over exploitation, for example 1.

simple_score = wins / played
UCB = simple_score + C * sqrt(log(parent's visited) / visited)
``````

The issue occurs when played or visited are 0. In this case I still want single, finite and completely defined values.

I'm considering these possibilities for use in the = 0 cases.

``````simple_score = 0
because the node has never won, although it's never lost either

simple_score = 0.5
because the node's value is completly uncertain and 0.5 is half way

UCB = simple_score + C * sqrt(parent's visited / 1)
UCB = simple_score
UCB = simple_score + C
``````

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There is a logarithm missing in your formula (and a constant) –  wildplasser Nov 25 '11 at 15:44
In "Ui = vi + c * sqrt((ln N)/ni)" the "ln N" part means logarithm of N? –  alan2here Nov 25 '11 at 15:56
Yes. It is basically a measure of entropy. The sqrt (ln(...))) can be thought of as an estimate for (standard) deviation. The c is the number of stddevs ("confidence") you intend to use as a safety bound/treshold. –  wildplasser Nov 25 '11 at 16:05
ty, I've updated the formuli above with this correction. The main question remains. –  alan2here Nov 25 '11 at 16:11
There is a paper, claiming that a beta-distribution fits better(gives better confidence intervals) for very small samples, but I cannot not find it. It was published about 3 years ago. BTW, normally they use natural logarithms (though the c could catch the slack) –  wildplasser Nov 25 '11 at 16:18
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