Martin Novotný

Position
Assistant Professor
Research Interests
Cryptography, Embedded systems, Digital design, Arithmetics
Room
A-1033
Address

Thákurova 2077/7
Praha

Biography

Martin Novotný graduated in electrical engineering from the Czech Technical University in Prague, the Czech Republic, in 1992. He received his Ph.D. degree in information security from Ruhr-University Bochum, Germany, in 2009.

He is an Assistant Professor and the Head of the Embedded Security Lab at the Czech Technical University in Prague. He serves as a member of the editorial board of Microprocessors and Microsystems journal and a program committee member in several international conferences focusing on cryptography and digital design. He was a program co-chair of DSD 2017, a program chair of DSD 2018, a general chair of CARDIS 2019, and a general co-chair of CHES 2023 conference. He is an author or co-author of 80+ journal and conference papers and book chapters. His research interests include arithmetic units, hardware for cryptography and cryptanalysis, efficient implementation of cryptographic algorithms, and embedded systems.

Dr. Novotný is a member of the IACR society.

Publications

2004

  • Schmidt, J., & Novotný, M. (2004, April). Scalable Shifter Synthesis for a Finite Field Arithmetic Unit. In 2004 7th IEEE Design and Diagnostics of Electronic Circuits & Systems Workshop (DDECS) (pp. 195-198). IEEE. [pdf]

2003

  • Schmidt, J., & Novotný, M. (2003). Scalable Multiplication and Inversion Unit for ECDSA. IFAC Proceedings Volumes, 36(1), 137-142. [doi]
  • Schmidt, J., & Novotný, M. (2003, December). Normal basis multiplication and inversion unit for elliptic curve cryptography. In 10th IEEE International Conference on Electronics, Circuits and Systems, 2003. ICECS 2003. Proceedings of the 2003 (Vol. 1, pp. 80-83). IEEE. [doi]

2002

  • Schmidt, J., Novotný, M., Jäger, M., Bečvář, M., & Jáchim, M. (2002, September). Exploration of design space in ECDSA. In International Conference on Field Programmable Logic and Applications (pp. 1072-1075). Springer, Berlin, Heidelberg. [doi]
  • Schmidt, J., Novotný, M., Jäger, M., Bečvář, M., & Jáchim, M. Comparison of the Polynomial and Optimal Normal Basis ECDSA for GF(2^162). In: Proceedings of IEEE Design and Diagnostics of Electronic Circuits and Systems Workshop 2002