Two-weight codes over the integers modulo a prime power

Abstract

Let p be a prime number. Irreducible cyclic codes of length p2-1 and dimension 2 over the integers modulo ph are shown to have exactly two nonzero Hamming weights. The construction uses the Galois ring of characteristic ph and order p2h. When the check polynomial is primitive, the code meets the Griesmer bound of (Shiromoto, Storme) (2012). By puncturing some projective codes are constructed. Those in length p+1 meet a Singleton-like bound of (Shiromoto , 2000). An infinite family of strongly regular graphs is constructed as coset graphs of the duals of these projective codes. A common cover of all these graphs, for fixed p, is provided by considering the Hensel lifting of these cyclic codes over the p-adic numbers.