Competitive regret

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In decision theory, competitive regret is the relative regret compared to an oracle with limited or unlimited power in the process of distribution estimation.

Consider estimating a discrete probability distribution ${\displaystyle p}$ on a discrete set ${\displaystyle {\mathcal {X}}}$ based on data ${\displaystyle X}$, the regret of an estimator^[1] ${\displaystyle q}$ is defined as

${\displaystyle \max _{p\in {\mathcal {P}}}r_{n}(q,p).}$

where ${\displaystyle {\mathcal {P}}}$ is the set of all possible probability distribution, and

${\displaystyle r_{n}(q,p)=\mathbb {E} (D(p||q(X))).}$

where ${\displaystyle D(p||q)}$ is the Kullback–Leibler divergence between ${\displaystyle p}$ and ${\displaystyle q}$.

The oracle is restricted to have access to partial information of the true distribution ${\displaystyle p}$ by knowing the location of ${\displaystyle p}$ in the parameter space up to a partition.^[1] Given a partition ${\displaystyle \mathbb {P} }$ of the parameter space, and suppose the oracle knows the subset ${\displaystyle P}$ where the true ${\displaystyle p\in P}$. The oracle will have regret as

${\displaystyle r_{n}(P)=\min _{q}\max _{p\in P}r_{n}(q,p).}$

The competitive regret to the oracle will be

${\displaystyle r_{n}^{\mathbb {P} }(q,{\mathcal {P}})=\max _{P\in \mathbb {P} }(r_{n}(q,P)-r_{n}(P)).}$

The oracle knows exactly ${\displaystyle p}$, but can only choose the estimator among natural estimators. A natural estimator assigns equal probability to the symbols which appear the same number of time in the sample.^[1] The regret of the oracle is

${\displaystyle r_{n}^{nat}(p)=\min _{q\in {\mathcal {Q}}_{nat}}r_{n}(q,p),}$

and the competitive regret is

${\displaystyle \max _{p\in {\mathcal {P}}}(r_{n}(q,p)-r_{n}^{nat}(p)).}$

For the estimator ${\displaystyle q}$ proposed in Acharya et al.(2013),^[2]

${\displaystyle r_{n}^{\mathbb {P} _{\sigma }}(q,\Delta _{k})\leq r_{n}^{nat}(q,\Delta _{k})\leq {\tilde {\mathcal {O}}}(\min({\frac {1}{\sqrt {n}}},{\frac {k}{n}})).}$

Here ${\displaystyle \Delta _{k}}$ denotes the k-dimensional unit simplex surface. The partition ${\displaystyle \mathbb {P} _{\sigma }}$ denotes the permutation class on ${\displaystyle \Delta _{k}}$, where ${\displaystyle p}$ and ${\displaystyle p'}$ are partitioned into the same subset if and only if ${\displaystyle p'}$ is a permutation of ${\displaystyle p}$.