Papers
-
A concentration inequality for product spaces,
with P. Dodos and V. Kanellopoulos,
submitted (11 pages).
-
A disjoint union theorem for trees,
with S. Todorcevic,
Advances in Mathematics, to appear (23 pages).
-
Primitive recursive bounds for the finite version of Gowers' c0 theorem,
Mathematika, to appear (19 pages).
-
Combinatorial structures on van der Waerden sets,
Combinatorics, Probability and Computing, to appear (24 pages).
-
On colorings of variable words,
Discrete Mathematics 338 (2015), no. 6, 1025-1028.
-
A density version of the Carlson-Simpson theorem,
with P. Dodos and V. Kanellopoulos,
Journal of the European Mathematical Society 16 (2014), no. 10, 2097-2164.
-
On the structure of the set of Higher order spreading models,
with B. Sari,
Studia Mathematica 223 (2014), no. 2, 149-173.
-
Measurable events indexed by words,
with P. Dodos and V. Kanellopoulos,
Journal of Combinatorial Theory, Series A 127 (2014), 176-223.
-
A simple proof of the density Hales-Jewett theorem,
with P. Dodos and V. Kanellopoulos,
International Mathematics Research Notices (2014), no. 12, 3340-3352.
-
Oscillation stability for continuous monotone surjections,
with S. Todorcevic,
Discrete Mathematics 324 (2014), 4-12.
-
Measurable events indexed by products of trees,
with P. Dodos and V. Kanellopoulos,
Combinatorica 34 (2014), no. 4, 427-470.
-
Dense subsets of products of finite trees,
with P. Dodos and V. Kanellopoulos,
International Mathematics Research Notices (2013), no. 4, 924-970.
-
Finite Order Spreading Models,
with S. A. Argyros and V. Kanellopoulos,
Advances in Mathematics 234 (2013), 574-617.
-
Higher Order Spreading Models,
with S. A. Argyros and V. Kanellopoulos,
Fundamenta Mathematicae 221 (2013), no. 1, 23–68.
-
Subsets of products of finite sets of positive upper density,
with S. Todorcevic,
Journal of Combinatorial Theory, Series A 120 (2013), no. 1, 183-193.
-
Measurable events indexed by trees,
with P. Dodos and V. Kanellopoulos,
Combinatorics, Probability and Computing 21 (2012), no. 3, 374-411.
-
A discretized approach to W. T. Gowers' game,
with V. Kanellopoulos,
Bulletin of the Polish Academy of Sciences Mathematics 58 (2010), 1-16.