LSE creators

Number of items: 39.
Mathematics
  • Barbour, A.D., Brightwell, Graham, Luczak, Malwina J. (2022). Long-term concentration of measure and cut-off. Stochastic Processes and Their Applications, 152, 378 - 423. https://doi.org/10.1016/j.spa.2022.05.004 picture_as_pdf
  • Brightwell, Graham, Fairthorne, Marianne, Luczak, Malwina J. (2018). The supermarket model with bounded queue lengths in equilibrium. Journal of Statistical Physics, 173(3-4), 1149-1194. https://doi.org/10.1007/s10955-018-2044-7
  • Brightwell, Graham, House, Thomas, Luczak, Malwina J. (2018). Extinction times in the subcritical stochastic SIS logistic epidemic. Journal of Mathematical Biology, 77(2), 455-493. https://doi.org/10.1007/s00285-018-1210-5
  • Brightwell, Graham, Janson, Svante, Luczak, Malwina (2017). The greedy independent set in a random graph with given degrees. Random Structures and Algorithms, 51(4), 565 - 586. https://doi.org/10.1002/rsa.20716
  • Brightwell, Graham, Luczak, Malwina J. (2012). Order-invariant measures on fixed causal sets. Combinatorics, Probability and Computing, 21(03), 330-357. https://doi.org/10.1017/S0963548311000721
  • Brightwell, Graham, Luczak, Malwina J. (2012). Vertices of high degree in the preferential attachment tree. Electronic Journal of Probability, 17(0), 1-43. https://doi.org/10.1214/EJP.v17-1803
  • Brightwell, Graham, Luczak, Malwina J. (2011). Order-invariant measures on causal sets. Annals of Applied Probability, 21(4), 1493-1536. https://doi.org/10.1214/10-AAP736
  • Levin, David A., Luczak, Malwina J., Peres, Yuval (2010). Glauber dynamics for the mean-field Ising model: cut-off, critical power law, and metastability. Probability Theory and Related Fields, 146(1-2), 223-265. https://doi.org/10.1007/s00440-008-0189-z
  • Luczak, Malwina J. (2010). Minisymposium asymptotic properties of complex random systems and applications. In Fitt, Alistair D., Norbury, J., Oskendon, H., Wilson, R. E. (Eds.), Progress in Industrial Mathematics at Ecmi 2008 (pp. 123-124). Springer Berlin / Heidelberg. https://doi.org/10.1007/978-3-642-12110-4_12
  • Hofstad, Remco, Luczak, Malwina J. (2010). Random subgraphs of the 2D Hamming graph: the supercritical phase. Probability Theory and Related Fields, 147(1-2), 1-41. https://doi.org/10.1007/s00440-009-0200-3
  • Brightwell, Graham, Luczak, Malwina (2009). Order-invariant measures on fixed causal sets. arXiv.
  • Janson, Svante, Luczak, Malwina J. (2009). A new approach to the giant component problem. Random Structures and Algorithms, 34(2), 197-216. https://doi.org/10.1002/rsa.20231
  • Luczak, Malwina J. (2008). Concentration of measure and mixing of Markov chains. Discrete Mathematics and Theoretical Computer Science, 95-120.
  • Barbour, A. D., Luczak, Malwina J. (2008). Laws of large numbers for epidemic models with countably many types. Annals of Applied Probability, 18(6), 2208-2238. https://doi.org/10.1214/08-AAP521
  • Janson, Svante, Luczak, Malwina J. (2008). Susceptibility in subcritical random graphs. Journal of Mathematical Physics, 49, https://doi.org/10.1063/1.2982848
  • Janson, Svante, Luczak, Malwina J. (2008). Symptotic normality of the k-core in random graphs. Annals of Applied Probability, 18(3), 1085-1137. https://doi.org/10.1214/07-AAP478
  • Luczak, Malwina, McDiarmid, C (2007). Asymptotic distributions and chaos for the supermarket model. Electronic Journal of Probability, 12, 75-99.
  • Janson, S, Luczak, Malwina (2007). A simple solution to the k-core problem. Random Structures and Algorithms, 30(1-2), 50-62. https://doi.org/10.1002/rsa.20147
  • Janson, S, Luczak, Malwina (2007). Asymptotic normality of the k-core in random graphs. London School of Economics and Political Science.
  • Luczak, Malwina, McDiarmid, C (2007). Balanced routing of random calls. London School of Economics and Political Science.
  • Levin, D, Luczak, Malwina, Peres, Y (2007). Glauber dynamics for the mean-field Ising model: cut-off, critical power law, and metastability. London School of Economics and Political Science.
  • van der Hofstad, R, Luczak, Malwina (2007). Random subgraphs of the 2D Hamming graph: the supercritical phase. London School of Economics and Political Science.
  • Janson, S, Luczak, Malwina (2007). A new approach to the giant component problem. (CDAM Research Report Series LSE-CDAM-2007-38). London School of Economics and Political Science.
  • Luczak, Malwina, Spencer, J (2007). The second largest component in the supercritical 2D Hamming graph. London School of Economics and Political Science.
  • Luczak, Malwina J., McDiarmid, Colin (2006). Asymptotic distributions and chaos for the supermarket model. (CDAM research report series LSE-CDAM-2006-12). Centre for Discrete and Applicable Mathematics, London School of Economics and Political Science.
  • Barbour, A. D., Luczak, Malwina J. (2006). Laws of large numbers for epidemic models with countably many types. (CDAM research report LSE-CDAM-2006-14). Centre for Discrete and Applicable Mathematics, London School of Economics and Political Science.
  • Luczak, Malwina J, McDiarmid, Colin (2006). On the maximum queue length in the supermarket model. Annals of Probability, 34(2), 493-527. https://doi.org/10.1214/00911790500000710
  • Luczak, Malwina J., Luczak, Tomasz (2006). The phase transition in the cluster-scaled model of a random graph. Random Structures and Algorithms, 28(2), 215-246. https://doi.org/10.1002/rsa.20088
  • Janson, Svante, Luczak, Malwina J. (2006). A simple solution to the k-core problem. (CDAM research report series 2006 LSE-CDAM-2006-13). Centre for Discrete and Applicable Mathematics, London School of Economics and Political Science.
  • Luczak, Malwina J, McDiarmid, Colin (2005). On the power of two choices: balls and bins in continuous time. Annals of Applied Probability, 15(3), 1733-1764. https://doi.org/10.1214/105051605000000205
  • Luczak, Malwina J, Norris, James (2005). Strong approximation for the supermarket model. Annals of Applied Probability, 15(3), 2038-2061. https://doi.org/10.1214/105051605000000368
  • Luczak, Malwina J., Winkler, Peter (2004). Building uniformly random subtrees. Random Structures and Algorithms, 24(4), 420-443. https://doi.org/10.1002/rsa.20011
  • Luczak, Malwina J., McDiarmid, Colin (2003). Concentration for locally acting permutations. Discrete Mathematics, 265(1-3), 159-171.
  • Luczak, Malwina J., McDiarmid, Colin, Upfal, Eli (2003). On-line routing of random calls in networks. Probability Theory and Related Fields, 125(4), 457-482. https://doi.org/10.1007/s00440-002-0242-2
  • Luczak, Malwina J. (2003). A quantitative law of large numbers via exponential martingales. In Gine, Evariste, Houdre, Christian, Nualart, David (Eds.), Stochastic Inequalities and Applications (pp. 93-112). Birkhàˆuser (Firm).
  • Luczak, Malwina J., Noble, S. D. (2002). Optimal arrangement of data in a tree directory. Discrete Applied Mathematics, 121(1-3), 307-315. https://doi.org/10.1016/S0166-218X(02)00180-4
  • Luczak, Malwina J. (2002-07-08 - 2002-07-12) Calibration of remote sensing measurements from surface observations [Paper]. Workshop on Industrial Applications, Hong Kong, HKG.
  • Luczak, Malwina J. (2002-07-08 - 2002-07-12) Risk management for traffic safety control [Paper]. Workshop on Industrial Applications, Hong Kong, HKG.
  • Luczak, Malwina J., McDiarmid, Colin (2001). Bisecting sparse random graphs. Random Structures and Algorithms, 18(1), 31-38. https://doi.org/10.1002/1098-2418(200101)18:1<31::AID-RSA3>3.0.CO;2-1
    • Statistics
  • Luczak, Malwina J, McDiarmid, Colin (2006). On the maximum queue length in the supermarket model. Annals of Probability, 34(2), 493-527. https://doi.org/10.1214/00911790500000710