Some new results on permutation trinomials over finite fields with even characteristic
Abstract
The construction of permutation trinomials of the form Xr(Xα (2m-1)+Xβ(2m-1) + 1) over 22m, where m,~r and α > β are positive integers, is an active area of research. Several classes of permutation trinomials with fixed values of α, β and r have been studied. Here, we construct three new classes of permutation trinomials with (α,β,r)∈\(7,5,7),(8,6,9),(10,4,11)\ over 22m. We also analyze the quasi-multiplicative equivalence of the newly obtained classes of permutation trinomials to both the existing ones and to each other. Additionally, we prove the nonexistence of a class of permutation trinomials over 22m of the same type for r=9, α=7, and β=3 when m > 3. Furthermore, we provide a proof for a conjecture on the quasi-multiplicative equivalence of two classes of permutation trinomials, as proposed by Yadav, Gupta, Singh, and Yadav (2024).
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