The cover metric is suitable for describing the resilience against correlated errors in arrays, in particular crisscross errors, which makes it interesting for applications such as distributed data storage (DDS). In this work, we consider codes designed for the cover metric that have {locality}, that means lost symbols can be recovered by using only a few other (local) symbols.
We derive and prove a Singleton-like bound on the minimum cover distance of cover-metric codes with locality and propose a bound-achieving construction.
Further, we explore the performance of our construction in comparison to a known construction based on rank-metric codes.
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The cover metric is suitable for describing the resilience against correlated errors in arrays, in particular crisscross errors, which makes it interesting for applications such as distributed data storage (DDS). In this work, we consider codes designed for the cover metric that have {locality}, that means lost symbols can be recovered by using only a few other (local) symbols.
We derive and prove a Singleton-like bound on the minimum cover distance of cover-metric codes with locality and propo...
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