A Class of Non-Linearly Solvable Networks
Abstract
For each integer m ≥ 2, a network is constructed which is solvable over an alphabet of size m but is not solvable over any smaller alphabets. If m is composite, then the network has no vector linear solution over any R-module alphabet and is not asymptotically linear solvable over any finite-field alphabet. The network's capacity is shown to equal one, and when m is composite, its linear capacity is shown to be bounded away from one for all finite-field alphabets.
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