By the same authors

Multilinear cryptography using nilpotent groups

Research output: Chapter in Book/Report/Conference proceedingConference contribution

Standard

Multilinear cryptography using nilpotent groups. / Kahrobaei, Delaram; Tortora, Antonio; Tota, Maria.

Elementary Theory of Groups and Group Rings, and Related Topics: Proceedings of the Conference held at Fairfield University and at the Graduate Center, CUNY, November 1-2, 2018. ed. / Paul Baginski; Benjamin Fine; Anja Moldenhauer; Gerhard Rosenberger; Shpilrain Vladimir. de Gruyter, 2020. p. 127-134 (De Gruyter Proceedings in Mathematics).

Research output: Chapter in Book/Report/Conference proceedingConference contribution

Harvard

Kahrobaei, D, Tortora, A & Tota, M 2020, Multilinear cryptography using nilpotent groups. in P Baginski, B Fine, A Moldenhauer, G Rosenberger & S Vladimir (eds), Elementary Theory of Groups and Group Rings, and Related Topics: Proceedings of the Conference held at Fairfield University and at the Graduate Center, CUNY, November 1-2, 2018. De Gruyter Proceedings in Mathematics, de Gruyter, pp. 127-134, Elementary theory of groups and group rings and related topics, Fairfield, United States, 1/11/18. https://doi.org/10.1515/9783110638387-013

APA

Kahrobaei, D., Tortora, A., & Tota, M. (2020). Multilinear cryptography using nilpotent groups. In P. Baginski, B. Fine, A. Moldenhauer, G. Rosenberger, & S. Vladimir (Eds.), Elementary Theory of Groups and Group Rings, and Related Topics: Proceedings of the Conference held at Fairfield University and at the Graduate Center, CUNY, November 1-2, 2018 (pp. 127-134). (De Gruyter Proceedings in Mathematics). de Gruyter. https://doi.org/10.1515/9783110638387-013

Vancouver

Kahrobaei D, Tortora A, Tota M. Multilinear cryptography using nilpotent groups. In Baginski P, Fine B, Moldenhauer A, Rosenberger G, Vladimir S, editors, Elementary Theory of Groups and Group Rings, and Related Topics: Proceedings of the Conference held at Fairfield University and at the Graduate Center, CUNY, November 1-2, 2018. de Gruyter. 2020. p. 127-134. (De Gruyter Proceedings in Mathematics). https://doi.org/10.1515/9783110638387-013

Author

Kahrobaei, Delaram ; Tortora, Antonio ; Tota, Maria. / Multilinear cryptography using nilpotent groups. Elementary Theory of Groups and Group Rings, and Related Topics: Proceedings of the Conference held at Fairfield University and at the Graduate Center, CUNY, November 1-2, 2018. editor / Paul Baginski ; Benjamin Fine ; Anja Moldenhauer ; Gerhard Rosenberger ; Shpilrain Vladimir. de Gruyter, 2020. pp. 127-134 (De Gruyter Proceedings in Mathematics).

Bibtex - Download

@inproceedings{4f92a1ec36ca4441ab04ab1598f7dec8,
title = "Multilinear cryptography using nilpotent groups",
abstract = "In this paper, we develop a novel idea of multilinear cryptosystem usingnilpotent group identities.",
author = "Delaram Kahrobaei and Antonio Tortora and Maria Tota",
note = "{\textcopyright} 2020 Walter de Gruyter GmbH, Berlin/Munich/Boston. Uploaded in accordance with the publisher{\textquoteright}s self-archiving policy. Further copying may not be permitted; contact the publisher for details; Elementary theory of groups and group rings and related topics : A conference in honor of Gilbert Baumslag and the 70th birthdays of Ben Fine and Tony Gaglione ; Conference date: 01-11-2018 Through 01-11-2018",
year = "2020",
month = feb,
day = "26",
doi = "10.1515/9783110638387-013",
language = "English",
series = "De Gruyter Proceedings in Mathematics",
publisher = "de Gruyter",
pages = "127--134",
editor = "Paul Baginski and Benjamin Fine and Anja Moldenhauer and Gerhard Rosenberger and Shpilrain Vladimir",
booktitle = "Elementary Theory of Groups and Group Rings, and Related Topics",
address = "Germany",

}

RIS (suitable for import to EndNote) - Download

TY - GEN

T1 - Multilinear cryptography using nilpotent groups

AU - Kahrobaei, Delaram

AU - Tortora, Antonio

AU - Tota, Maria

N1 - © 2020 Walter de Gruyter GmbH, Berlin/Munich/Boston. Uploaded in accordance with the publisher’s self-archiving policy. Further copying may not be permitted; contact the publisher for details

PY - 2020/2/26

Y1 - 2020/2/26

N2 - In this paper, we develop a novel idea of multilinear cryptosystem usingnilpotent group identities.

AB - In this paper, we develop a novel idea of multilinear cryptosystem usingnilpotent group identities.

U2 - 10.1515/9783110638387-013

DO - 10.1515/9783110638387-013

M3 - Conference contribution

T3 - De Gruyter Proceedings in Mathematics

SP - 127

EP - 134

BT - Elementary Theory of Groups and Group Rings, and Related Topics

A2 - Baginski, Paul

A2 - Fine, Benjamin

A2 - Moldenhauer, Anja

A2 - Rosenberger, Gerhard

A2 - Vladimir, Shpilrain

PB - de Gruyter

T2 - Elementary theory of groups and group rings and related topics

Y2 - 1 November 2018 through 1 November 2018

ER -