| Year |
Citation |
Score |
| 2020 |
Aishwarya G, Madiman M. Conditional Rényi Entropy and the Relationships between Rényi Capacities. Entropy (Basel, Switzerland). 22. PMID 33286298 DOI: 10.3390/E22050526 |
0.394 |
|
| 2020 |
Fradelizi M, Li J, Madiman M. Concentration of information content for convex measures Electronic Journal of Probability. 25. DOI: 10.1214/20-Ejp416 |
0.38 |
|
| 2019 |
Madiman M, Ghassemi F. Combinatorial Entropy Power Inequalities: A Preliminary Study of the Stam Region Ieee Transactions On Information Theory. 65: 1375-1386. DOI: 10.1109/Tit.2018.2854545 |
0.398 |
|
| 2019 |
Madiman M, Wang L, Woo JO. Majorization and Rényi entropy inequalities via Sperner theory Discrete Mathematics. 342: 2911-2923. DOI: 10.1016/J.Disc.2019.03.002 |
0.618 |
|
| 2019 |
Gozlan N, Madiman M, Roberto C, Samson P. Deviation Inequalities For Convex Functions Motivated By The Talagrand Conjecture Journal of Mathematical Sciences. 238: 453-462. DOI: 10.1007/S10958-019-04249-2 |
0.411 |
|
| 2018 |
Fradelizi M, Madiman M, Marsiglietti A, Zvavitch A. The convexification effect of Minkowski summation Arxiv: Functional Analysis. 5: 1-64. DOI: 10.4171/Emss/26 |
0.304 |
|
| 2018 |
Madiman M, Kontoyiannis I. Entropy Bounds on Abelian Groups and the Ruzsa Divergence Ieee Transactions On Information Theory. 64: 77-92. DOI: 10.1109/Tit.2016.2620470 |
0.698 |
|
| 2016 |
Li J, Fradelizi M, Madiman M. Information concentration for convex measures Ieee International Symposium On Information Theory - Proceedings. 2016: 1128-1132. DOI: 10.1109/ISIT.2016.7541475 |
0.304 |
|
| 2016 |
Fradelizi M, Madiman M, Marsiglietti A, Zvavitch A. Do Minkowski averages get progressively more convex? Comptes Rendus Mathematique. 354: 185-189. DOI: 10.1016/J.Crma.2015.12.005 |
0.374 |
|
| 2015 |
Woo JO, Madiman M. A discrete entropy power inequality for uniform distributions Ieee International Symposium On Information Theory - Proceedings. 2015: 1625-1629. DOI: 10.1109/ISIT.2015.7282731 |
0.341 |
|
| 2014 |
Wang L, Madiman M. Beyond the entropy power inequality, via rearrangements Ieee Transactions On Information Theory. 60: 5116-5137. DOI: 10.1109/Tit.2014.2338852 |
0.569 |
|
| 2014 |
Kontoyiannis I, Madiman M. Sumset and inverse sumset inequalities for differential entropy and mutual information Ieee Transactions On Information Theory. 60: 4503-4514. DOI: 10.1109/Tit.2014.2322861 |
0.633 |
|
| 2014 |
Madiman M, Wang L. An optimal varentropy bound for log-concave distributions 2014 International Conference On Signal Processing and Communications, Spcom 2014. DOI: 10.1109/SPCOM.2014.6983953 |
0.335 |
|
| 2014 |
Wang L, Woo JO, Madiman M. A lower bound on the Rényi entropy of convolutions in the integers Ieee International Symposium On Information Theory - Proceedings. 2829-2833. DOI: 10.1109/ISIT.2014.6875350 |
0.437 |
|
| 2014 |
Kagan AM, Tinghui Y, Barron A, Madiman M. Contribution to the Theory of Pitman Estimators Journal of Mathematical Sciences (United States). 199: 202-214. DOI: 10.1007/S10958-014-1847-6 |
0.393 |
|
| 2013 |
Kontoyiannis I, Madiman M. The entropy of sums and Rusza's divergence on abelian groups 2013 Ieee Information Theory Workshop, Itw 2013. DOI: 10.1109/ITW.2013.6691279 |
0.696 |
|
| 2013 |
Wang L, Madiman M. A new approach to the entropy power inequality, via rearrangements Ieee International Symposium On Information Theory - Proceedings. 599-603. DOI: 10.1109/ISIT.2013.6620296 |
0.351 |
|
| 2013 |
Johnson O, Kontoyiannis I, Madiman M. Log-concavity, ultra-log-concavity, and a maximum entropy property of discrete compound Poisson measures Discrete Applied Mathematics. 161: 1232-1250. DOI: 10.1016/J.Dam.2011.08.025 |
0.729 |
|
| 2013 |
Bobkov SG, Madiman MM. On the problem of reversibility of the entropy power inequality Springer Proceedings in Mathematics and Statistics. 42: 61-74. DOI: 10.1007/978-3-642-36068-8_4 |
0.338 |
|
| 2012 |
Kontoyiannis I, Madiman M. Sumset inequalities for differential entropy and mutual information Ieee International Symposium On Information Theory - Proceedings. 1261-1265. DOI: 10.1109/ISIT.2012.6283059 |
0.62 |
|
| 2012 |
Bobkov S, Madiman M. Reverse Brunn-Minkowski and reverse entropy power inequalities for convex measures Journal of Functional Analysis. 262: 3309-3339. DOI: 10.1016/J.Jfa.2012.01.011 |
0.415 |
|
| 2012 |
Madiman M, Marcus AW, Tetali P. Entropy and set cardinality inequalities for partition-determined functions Random Structures and Algorithms. 40: 399-424. DOI: 10.1002/Rsa.20385 |
0.484 |
|
| 2011 |
Bobkov S, Madiman M. Concentration of the information in data with log-concave distributions Annals of Probability. 39: 1528-1543. DOI: 10.1214/10-Aop592 |
0.427 |
|
| 2011 |
Bobkov S, Madiman M. The entropy per coordinate of a random vector is highly constrained under convexity conditions Ieee Transactions On Information Theory. 57: 4940-4954. DOI: 10.1109/Tit.2011.2158475 |
0.508 |
|
| 2011 |
Bobkov S, Madiman M. Dimensional behaviour of entropy and information Comptes Rendus Mathematique. 349: 201-204. DOI: 10.1016/J.Crma.2011.01.008 |
0.353 |
|
| 2010 |
Barbour AD, Johnson O, Kontoyiannis I, Madiman M. Compound poisson approximation via information functionals Electronic Journal of Probability. 15: 1344-1368. DOI: 10.1214/Ejp.V15-799 |
0.708 |
|
| 2010 |
Madiman M, Tetali P. Information inequalities for joint distributions, with interpretations and applications Ieee Transactions On Information Theory. 56: 2699-2713. DOI: 10.1109/Tit.2010.2046253 |
0.488 |
|
| 2010 |
Bobkov S, Madiman M. Entropy and the hyperplane conjecture in convex geometry Ieee International Symposium On Information Theory - Proceedings. 1438-1442. DOI: 10.1109/ISIT.2010.5513619 |
0.362 |
|
| 2010 |
Madiman M, Kontoyiannis I. The entropies of the sum and the difference of two IID random variables are not too different Ieee International Symposium On Information Theory - Proceedings. 1369-1372. DOI: 10.1109/ISIT.2010.5513562 |
0.592 |
|
| 2009 |
Johnson O, Kontoyiannis I, Madiman M. A criterion for the compound poisson distribution to be maximum entropy Ieee International Symposium On Information Theory - Proceedings. 1899-1903. DOI: 10.1109/ISIT.2009.5205527 |
0.696 |
|
| 2008 |
Madiman M. Cores of cooperative games in information theory Eurasip Journal On Wireless Communications and Networking. 2008. DOI: 10.1155/2008/318704 |
0.351 |
|
| 2008 |
Madiman M. On the entropy of sums 2008 Ieee Information Theory Workshop, Itw. 303-307. DOI: 10.1109/ITW.2008.4578674 |
0.4 |
|
| 2007 |
Madiman M, Barron A. Generalized entropy power inequalities and monotonicity properties of information Ieee Transactions On Information Theory. 53: 2317-2329. DOI: 10.1109/Tit.2007.899484 |
0.483 |
|
| 2007 |
Madiman M, Tetali P. Sandwich bounds for joint entropy Ieee International Symposium On Information Theory - Proceedings. 511-515. DOI: 10.1109/ISIT.2007.4557276 |
0.351 |
|
| 2007 |
Madiman M, Johnson O, Kontoyiannis I. Fisher information, compound Poisson approximation, and the Poisson channel Ieee International Symposium On Information Theory - Proceedings. 976-980. DOI: 10.1109/ISIT.2007.4557115 |
0.601 |
|
| 2006 |
Kontoyiannis I, Madiman M. Measure concentration for compound poisson distributions Electronic Communications in Probability. 11: 45-57. DOI: 10.1214/Ecp.V11-1190 |
0.674 |
|
| 2006 |
Madiman M, Barron A. The monotonicity of information in the central limit theorem and entropy power inequalities Ieee International Symposium On Information Theory - Proceedings. 1021-1025. DOI: 10.1109/ISIT.2006.261882 |
0.344 |
|
| 2005 |
Madiman M, Kontoyiannis I. Concentration and relative entropy for compound poisson distributions Ieee International Symposium On Information Theory - Proceedings. 2005: 1833-1837. DOI: 10.1109/ISIT.2005.1523662 |
0.646 |
|
| 2004 |
Madiman M, Harrison M, Kontoyiannis I. Minimum description length vs. maximum likelihood in lossy data compression Ieee International Symposium On Information Theory - Proceedings. 461. |
0.587 |
|
| 2004 |
Kontoyiannis I, Madiman M. Entropy, compound poisson approximation, log-sobolev inequalities and measure concentration 2004 Ieee Information Theory Workshop - Proceedings, Itw. 71-75. |
0.71 |
|
| Show low-probability matches. |
