Abstract
This paper shows new permutation polynomials over finite fields. Some of them are of the form \(\left( x^{p^k}\pm x+\delta \right) ^s +hx\). Some others are complete mappings.
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Akbary, A., Ghioca, D., Wang, Q.: On constructing permutation polynomials of finite fields. Finite Fields Appl. 17, 51–67 (2011)
Ball, S., Zieve, M.: Symplectic spreads and permutation polynomials. In: Mullen, G.L., Poli, A., Stichtenoth, H. (eds.) Finite Fields and Applications, Lecture Notes in Computer Science, vol. 2948, pp. 79–88. Springer, Berlin (2004)
Blokhuis, A., Coulter, R.S., Henderson, M., O’Keefe, C.M.: Permutations amongst the Dembowski–Ostrom polynomials. In: Jungnickel, D., Niederreiter, H. (eds.) Finite Fields and Applications: Proceedings of the Fifth International Conference on Finite Fields and Applications, pp. 37–42. Springer, Berlin (2001)
Budaghyan, L., Carlet, C., Leander, G.: Two classes of quadratic APN binomials inequivalent to power functions. IEEE Trans. Inf. Theory 54, 4218–4229 (2008)
Cao, X., Hu, L.: New methods for generating permutation polynomials over finite fields. Finite Fields Appl. 17, 493–503 (2011)
Cohen, S.D.: Exceptional polynomials and the reducibility of substitution polynomials. Enseign. Math. 36(2), 53–65 (1990)
Coulter, R.S.: Explicit evaluations of some Weil sums. Acta Arith. 83, 241–251 (1998)
Ding, C., Xiang, Q., Yuan, J., Yuan, P.: Explicit classes of permutation polynomials of \({\mathbb{F}}_{3^{3m}}\). Sci. China Ser. A 53, 639–647 (2009)
Dobbertin, H.: Almost perfect nonlinear power functions on GF\((2^n)\): the Welch case. IEEE Trans. Inf. Theory 45, 1271–1275 (1999)
Helleseth, T., Zinoviev, V.: New Kloosterman sums identities over \(F_{2^m}\) for all \(m\). Finite Fields Appl. 9, 187–193 (2003)
Hou, X.: A class of permutation trinomials over finite fields. Acta Arith. 162, 51–64 (2014)
Hou, X.: Determination of a type of permutation trinomials over finite fields. Acta Arith. 166, 253–278 (2014)
Hou, X.: Permutation polynomials over finite fields—a survey of recent advances. Finite Fields Appl. 32, 82–119 (2015)
Li, N., Helleseth, T., Tang, X.: Further results on a class of permutation polynomials over finite fields. Finite Fields Appl. 22, 16–23 (2013)
Li, Y., Wang, M.: On EA-equivalence of certain permutations to power mappings. Des. Codes Cryptogr. 58, 259–269 (2011)
Mullen, G.L., Niederreiter, H.: Dickson polynomials over finite fields and complete mappings. Can. Math. Bull. 30, 19–27 (1987)
Niederreiter, H., Robinson, K.H.: Complete mappings of finite fields. J. Aust. Math. Soc. Ser. A 33, 197–212 (1982)
Tu, Z., Zeng, X., Jiang, Y.: Two classes of permutation polynomials having the form \((x^{2^m}+x+\delta )^s+x\). Finite Fields Appl. 31, 12–24 (2015)
Tu, Z., Zeng, X., Li, C., Helleseth, T.: Permutation polynomials of the form \((x^{p^m}-x+\delta )^s+L(x)\) over the finite field \({\mathbb{F}}_{p^{2m}}\) of odd characteristic. Finite Fields Appl. 34, 20–35 (2015)
Wu, B., Lin, D.: On constructing complete permutation polynomials over finite fields of even characteristic. Discrete Appl. Math. 184, 213–222 (2015)
Yuan, J., Ding, C.: Four classes of permutation polynomials of \({\mathbb{F}}_{2^m}\). Finite Fields Appl. 13, 869–876 (2007)
Yuan, J., Ding, C.: Permutation polynomials over finite fields from a powerful lemma. Finite Fields Appl. 17, 560–574 (2011)
Yuan, P., Ding, C.: Further results on permutation polynomials over finite fields. Finite Fields Appl. 27, 88–103 (2014)
Yuan, J., Ding, C., Wang, H., Pieprzyk, J.: Permutation polynomials of the form \((x^p-x+\delta )^s + L(x)\). Finite Fields Appl. 14, 482–493 (2008)
Zha, Z., Hu, L.: Two classes of permutation polynomials over finite fields. Finite Fields Appl. 18, 781–790 (2012)
Zeng, X., Zhu, X., Hu, L.: Two new permutation polynomials with the form \((x^{2^k}+x+\delta )^s+x\) over \({\mathbb{F}}_{2^n}\). Appl. Algebra Eng. Commun. Comput. 21, 145–150 (2010)
Zieve, M.E.: Exceptional polynomials. In: Mullen, G.L., Panario, D. (eds.) Handbook of Finite Fields, pp. 236–240. CRC Press, Boca Raton (2013)
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Marcos, J.E. Some permutation polynomials over finite fields. AAECC 26, 465–474 (2015). https://doi.org/10.1007/s00200-015-0260-9
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DOI: https://doi.org/10.1007/s00200-015-0260-9