F. ÖZBUDAK And B. Gülmez Temür, "Classification of permutation polynomials of the form x3g(xq-1) of Fq2 where g(x) = x3+ bx+ c and b,c∈Fq∗," Designs, Codes, and Cryptography , vol.90, no.7, pp.1537-1556, 2022
ÖZBUDAK, F. And Gülmez Temür, B. 2022. Classification of permutation polynomials of the form x3g(xq-1) of Fq2 where g(x) = x3+ bx+ c and b,c∈Fq∗. Designs, Codes, and Cryptography , vol.90, no.7 , 1537-1556.
ÖZBUDAK, F., & Gülmez Temür, B., (2022). Classification of permutation polynomials of the form x3g(xq-1) of Fq2 where g(x) = x3+ bx+ c and b,c∈Fq∗. Designs, Codes, and Cryptography , vol.90, no.7, 1537-1556.
ÖZBUDAK, FERRUH, And Burcu Gülmez Temür. "Classification of permutation polynomials of the form x3g(xq-1) of Fq2 where g(x) = x3+ bx+ c and b,c∈Fq∗," Designs, Codes, and Cryptography , vol.90, no.7, 1537-1556, 2022
ÖZBUDAK, FERRUH And Gülmez Temür, Burcu G. . "Classification of permutation polynomials of the form x3g(xq-1) of Fq2 where g(x) = x3+ bx+ c and b,c∈Fq∗." Designs, Codes, and Cryptography , vol.90, no.7, pp.1537-1556, 2022
ÖZBUDAK, F. And Gülmez Temür, B. (2022) . "Classification of permutation polynomials of the form x3g(xq-1) of Fq2 where g(x) = x3+ bx+ c and b,c∈Fq∗." Designs, Codes, and Cryptography , vol.90, no.7, pp.1537-1556.
@article{article, author={FERRUH ÖZBUDAK And author={Burcu Gülmez Temür}, title={Classification of permutation polynomials of the form x3g(xq-1) of Fq2 where g(x) = x3+ bx+ c and b,c∈Fq∗}, journal={Designs, Codes, and Cryptography}, year=2022, pages={1537-1556} }