On the Characteristic Polynomial of Linearized Polynomials
Abstract
Let k be a finite field, and L be a q-linearized polynomial defined over k of q-degree r (L=Σri=0aiZqi, with ai∈ k). This paper provides an algorithm to compute a characteristic polynomial of L over a large extension field Fqn⊃eq k. Our algorithm has computational complexity of O(n((n))4) in terms of Fq operations with the implied constant depending only on k and r. Up to logarithmic factors, and for linear maps represented by low degree polynomials, this provides a square root improvement over generic algorithms.
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