JF IEEE Transactions on Knowledge & Data Engineering

YR 2003

VO 15

IS

SP 659

TI Multidimensional Declustering Schemes Using Golden Ratio and Kronecker Sequences

A1 Randeep Bhatia,

A1 Rakesh K. Sinha,

A1 Chung-Min Chen,

K1 Declustering

K1 disk allocation

K1 parallel databases.

AB <p><b>Abstract</b>—We propose a new declustering scheme for allocating uniform multidimensional data among parallel disks. The scheme, aimed at reducing disk access time for range queries, is based on Golden Ratio Sequences for two dimensions and Kronecker Sequences for higher dimensions. Using exhaustive simulation, we show that, in two dimensions, the worst-case (additive) deviation of the scheme from the optimal response time for any range query is one when the number of disks (<tmath>M</tmath>) is at most 22; its worst-case deviation is two when <tmath>M \leq 94</tmath>; and its worst-case deviation is four when <tmath>M \leq 550</tmath>. In two dimensions, we prove that whenever <tmath>M</tmath> is a Fibonacci number, the average performance of the scheme is within 14 percent of the (generally, unachievable) strictly optimal scheme and its worst-case response time is within a multiplicative factor three of the optimal response time for any query, and within a factor <tmath>1.5</tmath> of the optimal for large queries. We also present comprehensive simulation results, on two-dimensional as well as on higher-dimensional data, that compare and demonstrate the advantages of our scheme over some recently proposed schemes in the literature.</p>

PB IEEE Computer Society, [URL:http://www.computer.org]

SN 1041-4347

LA English

DO 10.1109/TKDE.2003.1198397

LK http://doi.ieeecomputersociety.org/10.1109/TKDE.2003.1198397