Abstract
Fractional repetition (FR) codes form a special class of minimum bandwidth regenerating codes by providing uncoded repairs via a table-based repair model. For a given file size, it is desirable to design FR codes that minimize the reconstruction degree, which is defined as the number of storage nodes required for data retrieval. In this paper, we first consider a lower bound on the reconstruction degree of FR codes obtained by Silberstein and Etzion. We present several families of FR codes that attain this lower bound, which are derived from combinatorial designs and regular graphs. We further provide a new lower bound on the reconstruction degree of FR codes, which is tighter than the existing one. Moreover, we show that for an FR code with reconstruction degree achieving the lower bounds, the corresponding dual code attains upper bounds on the supported file size.
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