Russell Impagliazzo
(Redirected from Russell Graham Impagliazzo)
Russell Graham Impagliazzo | |
|---|---|
 Russell Impagliazzo at the DIMACS Workshop on Cryptography, July 2016. | |
| Alma mater | Wesleyan University; University of California, Berkeley |
| Known for | Results in computational complexity theory |
| Scientific career | |
| Thesis | Pseudo-random Generators for Probablistic Algorithms and for Cryptography (1992) |
| Doctoral advisor | Manuel Blum |
| Website | https://cseweb.ucsd.edu//~russell/ |
Russell Graham Impagliazzo[1] is a professor of computer science at the University of California, San Diego, specializing in computational complexity theory.[2]
Education[edit]
Impagliazzo received a BA in mathematics from Wesleyan University.[3] He obtained a doctorate from the University of California, Berkeley in 1992. His advisor was Manuel Blum.[1] He joined the faculty of UCSD in 1989,[4] having been a postdoc there from 1989 to 1991.[3]
Contributions[edit]
Impagliazzo's contributions to complexity theory include:
- the construction of a pseudorandom number generator from any one-way function,[5]
- his proof of Yao's XOR lemma via "hard core sets",[6]
- his proof of the exponential size lower bound for constant-depth Hilbert proofs of the pigeonhole principle,[7]
- his work on connections between computational hardness and de-randomization,[8][9][10][11]
- and his work on the construction of multi-source seedless extractors.[12]
- stating the exponential time hypothesis that 3-SAT cannot be solved in subexponential time in the number of variables,[13] This hypothesis is used to deduce lower bounds on algorithms in computer science.[14][15]
Five worlds of complexity theory[edit]
Impagliazzo is well-known for proposing the "five worlds" of computational complexity theory, reflecting possible states of the world around the P versus NP problem.[16]
- Algorithmica: P = NP;
- Heuristica: P is not NP, but NP problems are tractable on average;
- Pessiland: there are NP problems that are hard on average, but no one-way functions;
- Minicrypt: one-way functions exist, but public-key cryptography does not;
- Cryptomania: public-key cryptography exists.
Understanding which world we live in is still a key motivating question in complexity theory and cryptography.[17]
Awards[edit]
Impagliazzo has received the following awards:
- Best Paper Award from the Computational Complexity Conference[3]
- 2003 Outstanding Paper Award from the Society for Industrial and Applied Mathematics[4]
- 2003 Best Paper Award at the Symposium on Theory of Computing[4]
- named a 2004 Guggenheim fellow for work on "heuristics, proof complexity, and algorithmic techniques"[4]
References[edit]
- ^ a b "Russell Impagliazzo - The Mathematics Genealogy Project". mathgenealogy.org. Retrieved 2021-08-30.
- ^ "Russell Impagliazzo's". cseweb.ucsd.edu. Retrieved 2021-08-30.
- ^ a b c "Russell Impagliazzo | Simons Institute for the Theory of Computing". simons.berkeley.edu. Retrieved 2021-08-30.
- ^ a b c d "Faculty Profile | Jacobs School of Engineering". jacobsschool.ucsd.edu. Retrieved 2021-08-30.
- ^ HÅstad, Johan; Impagliazzo, Russell; Levin, Leonid A.; Luby, Michael (1999). "A Pseudorandom Generator from any One-way Function" (PDF). SIAM Journal on Computing. 28 (4): 1364–1396. doi:10.1137/S0097539793244708. ISSN 0097-5397.
- ^ Impagliazzo, Russell (1995). "Hard-core distributions for somewhat hard problems". Proceedings of IEEE 36th Annual Foundations of Computer Science. Proceedings of IEEE 36th Annual Foundations of Computer Science. pp. 538–545. doi:10.1109/SFCS.1995.492584. ISBN 0-8186-7183-1. Retrieved 30 August 2021.
- ^ Beame, Paul; Impagliazzo, Russell; Krajíček, Jan; Pitassi, Toniann; Pudlák, Pavel (1996). "Lower Bounds on Hilbert's Nullstellensatz and Propositional Proofs". Proceedings of the London Mathematical Society. s3-73 (1): 1–26. doi:10.1112/plms/s3-73.1.1. ISSN 1460-244X.
- ^ Kabanets, Valentine; Impagliazzo, Russell (2004-12-01). "Derandomizing Polynomial Identity Tests Means Proving Circuit Lower Bounds". Computational Complexity. 13 (1): 1–46. doi:10.1007/s00037-004-0182-6. ISSN 1420-8954. S2CID 12451799.
- ^ Impagliazzo, Russell; Wigderson, Avi (1997-05-04). "P = BPP if E requires exponential circuits". Proceedings of the twenty-ninth annual ACM symposium on Theory of computing - STOC '97. El Paso, Texas, USA: Association for Computing Machinery. pp. 220–229. doi:10.1145/258533.258590. ISBN 978-0-89791-888-6. S2CID 18921599.
- ^ Impagliazzo, Russell (2003-04-28). "Hardness as randomness: a survey of universal derandomization". arXiv:cs/0304040.
- ^ Carmosino, Marco L.; Impagliazzo, Russell; Kabanets, Valentine; Kolokolova, Antonina (2015). Garg, Naveen; Jansen, Klaus; Rao, Anup; Rolim, José D. P. (eds.). "Tighter Connections between Derandomization and Circuit Lower Bounds". Approximation, Randomization, and Combinatorial Optimization. Algorithms and Techniques (APPROX/RANDOM 2015). Leibniz International Proceedings in Informatics (LIPIcs). 40. Dagstuhl, Germany: Schloss Dagstuhl–Leibniz-Zentrum fuer Informatik: 645–658. doi:10.4230/LIPIcs.APPROX-RANDOM.2015.645. ISBN 978-3-939897-89-7.
- ^ Barak, B.; Impagliazzo, R.; Wigderson, A. (2004). "Extracting Randomness Using Few Independent Sources". 45th Annual IEEE Symposium on Foundations of Computer Science. pp. 384–393. doi:10.1109/FOCS.2004.29. ISBN 0-7695-2228-9. S2CID 7063583.
- ^ Impagliazzo, Russell; Paturi, Ramamohan (2001-03-01). "On the Complexity of k-SAT". Journal of Computer and System Sciences. 62 (2): 367–375. doi:10.1006/jcss.2000.1727. ISSN 0022-0000.
- ^ Lokshtanov, Daniel; Marx, Dániel; Saurabh, Saket (October 2011). "Lower Bounds based on the Exponential Time Hypothesis". Bulletin of the EATCS: 41–71. CiteSeerX 10.1.1.942.6217.
- ^ Williams, Virginia V. (2015). Hardness of Easy Problems: Basing Hardness on Popular Conjectures such as the Strong Exponential Time Hypothesis (PDF). 10th International Symposium on Parameterized and Exact Computation. pp. 17–29. doi:10.4230/LIPIcs.IPEC.2015.17.
- ^ Impagliazzo, Russell (April 17, 1995). "A Personal View of Average-Case Complexity".
- ^ Klarreich, Erica (April 18, 2022). "Which Computational Universe Do We Live In?". Quanta.
