Weight hierarchies of three-weight p-ary linear codes from inhomogeneous quadratic forms
Abstract
The weight distribution and weight hierarchy of a linear code are two important research topics in coding theory. In this paper, choosing D=\(x,y)∈ (ps1×ps2)\(0,0)\: f(x)+1s2(α y)=0\ as a defining set , where α∈Fps2* and f(x) is a quadratic form over Fps1 with values in p, whether f(x) is non-degenerate or not, we construct a family of three-weight p-ary linear codes and determine their weight distributions and weight hierarchies. Most of the codes can be used in secret sharing schemes.
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