Krichevsky–Trofimov estimator

In information theory, given an unknown stationary source $π$ with alphabet A and a sample w from $π$ , the Krichevsky–Trofimov (KT) estimator produces an estimate p_i(w) of the probability of each symbol i ∈ A. This estimator is optimal in the sense that it minimizes the worst-case regret asymptotically.

For a binary alphabet and a string w with m zeroes and n ones, the KT estimator p_i(w) is defined as:[1]

{\begin{aligned}p_{0}(w)&={\frac {m+1/2}{m+n+1}},\\[5pt]p_{1}(w)&={\frac {n+1/2}{m+n+1}}.\end{aligned}}

References

Krichevsky, R. E. and Trofimov V. K. (1981), "The Performance of Universal Encoding", IEEE Trans. Inf. Theory, Vol. IT-27, No. 2, pp. 199–207.

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[1] Krichevsky, R. E. and Trofimov V. K. (1981), "The Performance of Universal Encoding", IEEE Trans. Inf. Theory, Vol. IT-27, No. 2, pp. 199–207.

Krichevsky–Trofimov estimator

See also

References