Martin's Maximum, saturated ideals, and non-regular ultrafilters. Part I M Foreman, M Magidor, S Shelah Annals of Mathematics, 1-47, 1988 | 537 | 1988 |
Squares, scales and stationary reflection J Cummings, M Foreman, M Magidor Journal of Mathematical Logic 1 (01), 35-98, 2001 | 237 | 2001 |
Handbook of set theory M Foreman, A Kanamori Springer Science & Business Media, 2009 | 142 | 2009 |
Ideals and generic elementary embeddings M Foreman Handbook of set theory, 885-1147, 2009 | 120 | 2009 |
Large cardinals and definable counterexamples to the continuum hypothesis M Foreman, M Magidor Annals of Pure and Applied Logic 76 (1), 47-97, 1995 | 112 | 1995 |
An anti-classification theorem for ergodic measure preserving transformations M Foreman, B Weiss Journal of the European Mathematical Society 6 (3), 277-292, 2004 | 108 | 2004 |
The tree property J Cummings, M Foreman Advances in Mathematics 133 (1), 1-32, 1998 | 99 | 1998 |
The generalized continuum hypothesis can fail everywhere M Foreman, WH Woodin Annals of Mathematics 133 (1), 1-35, 1991 | 99 | 1991 |
The conjugacy problem in ergodic theory M Foreman, DJ Rudolph, B Weiss Annals of mathematics, 1529-1586, 2011 | 86 | 2011 |
A very weak square principle M Foreman, M Magidor The Journal of Symbolic Logic 62 (1), 175-196, 1997 | 84 | 1997 |
Mutually stationary sequences of sets and the non-saturation of the non-stationary ideal on Pϰ(λ) M Foreman, M Magidor | 69 | 2001 |
Games played on Boolean algebras M Foreman The Journal of symbolic logic 48 (3), 714-723, 1983 | 62 | 1983 |
Potent axioms M Foreman Transactions of the American Mathematical Society 294 (1), 1-28, 1986 | 59 | 1986 |
More saturated ideals M Foreman Cabal Seminar 79–81: Proceedings, Caltech-UCLA Logic Seminar 1979–81, 1-27, 2006 | 58 | 2006 |
Banach-Tarski decompositions using sets with the property of Baire R Dougherty, M Foreman Journal of the American Mathematical Society 7 (1), 75-124, 1994 | 55 | 1994 |
A new Löwenheim-Skolem theorem M Foreman, S Todorcevic Transactions of the American Mathematical Society 357 (5), 1693-1715, 2005 | 51 | 2005 |
The Hahn-Banach theorem implies the existence of a non-Lebesgue measurable set M Foreman, F Wehrung Fundamenta Mathematicae 138, 13-19, 1991 | 45 | 1991 |
Canonical structure in the universe of set theory: Part two J Cummings, M Foreman, M Magidor Annals of Pure and Applied Logic 142 (1-3), 55-75, 2006 | 43 | 2006 |
Canonical structure in the universe of set theory: part one J Cummings, M Foreman, M Magidor Annals of Pure and Applied Logic 129 (1-3), 211-243, 2004 | 43 | 2004 |
Some downwards transfer properties for N2 M Foreman, R Laver Advances in Mathematics 67 (2), 230-238, 1988 | 37 | 1988 |