Universal $L^s$-rate-optimality of $L^r$-optimal quantizers by dilatation and contraction

Sagna, Abass

doi:10.1051/ps:2008008

Universal

L^{s}

-rate-optimality of

L^{r}

-optimal quantizers by dilatation and contraction

Sagna, Abass

ESAIM: Probability and Statistics, Tome 13 (2009), pp. 218-246.

Résumé

We investigate in this paper the properties of some dilatations or contractions of a sequence ${(α_{n})}_{n \geq 1}$ of $L^{r}$ -optimal quantizers of an $ℝ^{d}$ -valued random vector $X \in L^{r} (ℙ)$ defined in the probability space $(Ω, 𝒜, ℙ)$ with distribution $ℙ_{X} = P$ . To be precise, we investigate the $L^{s}$ -quantization rate of sequences $α_{n}^{θ, μ} = μ + θ (α_{n} - μ) = {μ + θ (a - μ), a \in α_{n}}$ when $θ \in ℝ_{+}^{☆}, μ \in ℝ, s \in (0, r)$ or $s \in (r, + \infty)$ and $X \in L^{s} (ℙ)$ . We show that for a wide family of distributions, one may always find parameters $(θ, μ)$ such that ${(α_{n}^{θ, μ})}_{n \geq 1}$ is $L^{s}$ -rate-optimal. For the gaussian and the exponential distributions we show the existence of a couple $(θ^{☆}, μ^{☆})$ such that ${(α^{θ^{☆}, μ^{☆}})}_{n \geq 1}$ also satisfies the so-called $L^{s}$ -empirical measure theorem. Our conjecture, confirmed by numerical experiments, is that such sequences are asymptotically $L^{s}$ -optimal. In both cases the sequence ${(α^{θ^{☆}, μ^{☆}})}_{n \geq 1}$ is incredibly close to $L^{s}$ -optimality. However we show (see Rem. 5.4) that this last sequence is not $L^{s}$ -optimal (e.g. when $s$ = 2, $r$ = 1) for the exponential distribution.

DOI : 10.1051/ps:2008008

Classification : 60G15, 60G35, 41A52
Mots clés : rate-optimal quantizers, empirical measure theorem, dilatation, Lloyd algorithm

@article{PS_2009__13__218_0,
     author = {Sagna, Abass},
     title = {Universal $L^s$-rate-optimality of $L^r$-optimal quantizers by dilatation and contraction},
     journal = {ESAIM: Probability and Statistics},
     pages = {218--246},
     publisher = {EDP-Sciences},
     volume = {13},
     year = {2009},
     doi = {10.1051/ps:2008008},
     mrnumber = {2518547},
     language = {en},
     url = {http://archive.numdam.org/articles/10.1051/ps:2008008/}
}

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Sagna, Abass. Universal $L^s$-rate-optimality of $L^r$-optimal quantizers by dilatation and contraction. ESAIM: Probability and Statistics, Tome 13 (2009), pp. 218-246. doi : 10.1051/ps:2008008. http://archive.numdam.org/articles/10.1051/ps:2008008/

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