American Psychological Association 6th edition

Andreoli, S., & Petrides, G. (2025). Further existence results of decompositions of permutation polynomials. Cryptography and Communications: Discrete Structures, Boolean Functions and Sequences, 1-17. https://doi.org/10.1007/s12095-025-00820-8

ISO-690 (author-date, English)

ANDREOLI, Samuele and PETRIDES, George, 2025. Further existence results of decompositions of permutation polynomials. Cryptography and Communications: Discrete Structures, Boolean Functions and Sequences. 23 August 2025. P. 1-17. DOI 10.1007/s12095-025-00820-8.

Modern Language Association 9th edition

Andreoli, S., and G. Petrides. “Further Existence Results of Decompositions of Permutation Polynomials”. Cryptography and Communications: Discrete Structures, Boolean Functions and Sequences, Aug. 2025, pp. 1-17, https://doi.org/10.1007/s12095-025-00820-8.

Mohr Siebeck - Recht (Deutsch - Österreich)

Andreoli, Samuele/Petrides, George: Further existence results of decompositions of permutation polynomials, Cryptography and Communications: Discrete Structures, Boolean Functions and Sequences 2025, 1-17.

Emerald - Harvard

Andreoli, S. and Petrides, G. (2025), “Further existence results of decompositions of permutation polynomials”, Cryptography and Communications: Discrete Structures, Boolean Functions and Sequences, pp. 1-17.

Warning: These citations may not always be 100% accurate.