Nilanjana Datta
Alma materETH Zürich (PhD), Jadavpur University (BSc, MSc)
Scientific career
Fields
InstitutionsUniversity of Cambridge;
École Polytechnique Fédérale de Lausanne;
University of Strathclyde;
Dublin Institute for Advanced Studies;
CNRS Marseille
ThesisLow-temperature phase diagrams of quantum lattice systems and Properties of the edge of the Laughlin liquid
Doctoral advisorJürg Fröhlich, Rudolf Morf
Websitehttp://www.damtp.cam.ac.uk/user/nila/

Nilanjana Datta is an Indian-born British mathematician. She is a Professor in Quantum Information Theory (Grade 11) in the Department of Applied Mathematics and Theoretical Physics at the University of Cambridge, and a Fellow of Pembroke College.

Born in the Indian state of West Bengal, Datta graduated from Jadavpur University with a Master of Science and did a Post-MSc at the Saha Institute of Nuclear Physics. In 1995 she obtained a PhD from ETH Zürich under the supervision of Jürg Fröhlich and Rudolf Morf, working on quantum statistical mechanics and the Quantum Hall effect.[1] She then held postdoctoral positions at the CNRS Marseille, the Dublin Institute for Advanced Studies, the University of Strathclyde, and the École Polytechnique Fédérale de Lausanne. In 2001 she became an affiliated lecturer of the Faculty of Mathematics, University of Cambridge and a Fellow of Pembroke College.

After moving to Cambridge, Datta focused her research on the field of quantum information theory, contributing to topics such as quantum state transfer,[2][3][4] memory effects in quantum information theory,[5] and one-shot quantum information theory.[6][7][8][9] Her collaborators include Artur Ekert, Jürg Fröhlich, Alexander Holevo, Richard Jozsa, Mary Beth Ruskai, Mark Wilde, and Andreas Winter.

Datta is the founder of the Beyond i.i.d. in Information Theory Conferences series, which started in January 2013 in Cambridge, UK and has continued on an annual basis since then. The main goal of the conference, in which Datta has played a central role, is to bring together the various research communities working on quantum Shannon theory, quantum resource theories, classical information theory, and mathematical physics related to entropies and information, in order to encourage the exchange of research and foster collaborations.

References

  1. Datta, Nilanjana (1995). Low-temperature phase diagrams of quantum lattice systems and properties of the edge of the laughlin liquid (PhD). ETH Zürich. doi:10.3929/ethz-a-001503668. hdl:20.500.11850/142223.
  2. Christandl, Matthias; Datta, Nilanjana; Ekert, Artur; Landahl, Andrew J. (2004). "Perfect State Transfer in Quantum Spin Networks". Physical Review Letters. 92 (18): 187902. arXiv:quant-ph/0309131. Bibcode:2004PhRvL..92r7902C. doi:10.1103/PhysRevLett.92.187902. PMID 15169534. S2CID 16301105.
  3. Christandl, Matthias; Datta, Nilanjana; Dorlas, Tony C.; Ekert, Artur; Kay, Alastair; Landahl, Andrew J. (2005). "Perfect Transfer of Arbitrary States in Quantum Spin Networks". Physical Review A. 71 (3): 032312. arXiv:quant-ph/0411020. Bibcode:2005PhRvA..71c2312C. doi:10.1103/PhysRevA.71.032312. S2CID 41874805.
  4. Albanese, Claudio; Christandl, Matthias; Datta, Nilanjana; Ekert, Artur (2004). "Mirror Inversion of Quantum States in Linear Registers". Physical Review Letters. 93 (23): 230502. arXiv:quant-ph/0405029. Bibcode:2004PhRvL..93w0502A. doi:10.1103/PhysRevLett.93.230502. PMID 15601134. S2CID 20262265.
  5. Datta, Nilanjana; Dorlas, Tony C. (2007). "The coding theorem for a class of quantum channels with long-term memory". Journal of Physics A: Mathematical and Theoretical. 40 (28): 8147–8164. arXiv:quant-ph/0610049. Bibcode:2007JPhA...40.8147D. doi:10.1088/1751-8113/40/28/S20. S2CID 14072018.
  6. Datta, Nilanjana; Renner, Renato (2009). "Smooth Renyi Entropies and the Quantum Information Spectrum". IEEE Transactions on Information Theory. 55 (6): 2807–2815. arXiv:0801.0282. doi:10.1109/TIT.2009.2018340. S2CID 17671399.
  7. Datta, Nilanjana (2009). "Min- and Max- Relative Entropies and a New Entanglement Monotone". IEEE Transactions on Information Theory. 55 (6): 2816–2826. arXiv:0803.2770. doi:10.1109/TIT.2009.2018325. S2CID 18446285.
  8. Buscemi, Francesco; Datta, Nilanjana (2010). "The quantum capacity of channels with arbitrarily correlated noise". IEEE Transactions on Information Theory. 56 (3): 1447–1460. arXiv:0902.0158. doi:10.1109/TIT.2009.2039166. S2CID 2914012.
  9. Mosonyi, Milan; Datta, Nilanjana (2009). "Generalized relative entropies and the capacity of classical-quantum channels". Journal of Mathematical Physics. 50 (7): 072104. arXiv:0810.3478. Bibcode:2009JMP....50g2104M. doi:10.1063/1.3167288. S2CID 5457845.
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