Cummings, James - Department of Mathematical Sciences, Carnegie Mellon University

• A Descriptive View of Ergodic Theory Matthew Foreman
• Strong ultrapowers and long core models James Cummings, MIT
• DIAMOND AND ANTICHAINS JAMES CUMMINGS AND ERNEST SCHIMMERLING
• A MODEL IN WHICH GCH HOLDS AT SUCCESSORS BUT FAILS AT LIMITS
• Identity Crises and Strong Compactness II: Strong Cardinals
• A consistency result on weak reflection James Cummings \Lambda
• CANONICAL STRUCTURE IN THE UNIVERSE OF SET THEORY: PART TWO
• Large cardinal properties of small cardinals James Cummings
• BLOWING UP THE POWER SET OF THE LEAST ARTHUR W. APTER AND JAMES CUMMINGS
• BLOWING UP THE POWER SET OF THE LEAST ARTHUR W. APTER AND JAMES CUMMINGS
• Cardinal invariants above the continuum James Cummings
• SOUSLIN TREES WHICH ARE HARD TO SPECIALISE JAMES CUMMINGS
• Singular cardinal problems James Cummings
• \Identity Crises and Strong Compactness" Arthur W. Apter ;
• Possible behaviours for the Mitchell ordering James Cummings
• THE TREE PROPERTY JAMES CUMMINGS AND MATTHEW FOREMAN
• Some independence results on reflection James Cummings
• SQUARES, SCALES AND STATIONARY REFLECTION JAMES CUMMINGS, MATTHEW FOREMAN, AND MENACHEM
• A MODEL IN WHICH EVERY BOOLEAN ALGEBRA HAS MANY SUBALGEBRAS
• INDEXED SQUARES JAMES CUMMINGS AND ERNEST SCHIMMERLING
• CANONICAL STRUCTURE IN THE UNIVERSE OF SET THEORY: PART ONE
• COMPACTNESS AND INCOMPACTNESS PHENOMENA IN SET JAMES CUMMINGS
• A Descriptive View of Ergodic Theory Matthew Foreman
• 1. Iterated Forcing and Elementary James Cummings
• DIAMOND AND ANTICHAINS JAMES CUMMINGS AND ERNEST SCHIMMERLING
• PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY
• THE TREE PROPERTY JAMES CUMMINGS AND MATTHEW FOREMAN
• DIAMOND AND ANTICHAINS JAMES CUMMINGS AND ERNEST SCHIMMERLING
• Possible behaviours for the Mitchell ordering James Cummings
• PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY
• CANONICAL STRUCTURE IN THE UNIVERSE OF SET THEORY: PART TWO
• Coherent sequences versus Radin sequences James Cummings
• CANONICAL STRUCTURE IN THE UNIVERSE OF SET THEORY: PART ONE
• Cardinal invariants above the continuum James Cummings
• Strong ultrapowers and long core models James Cummings, MIT
• COLLAPSING SUCCESSORS OF SINGULARS JAMES CUMMINGS
• CANONICAL STRUCTURE IN THE UNIVERSE OF SET THEORY: PART TWO
• Coherent sequences versus Radin sequences James Cummings
• Possible behaviours for the Mitchell ordering II James Cummings
• COMPACTNESS AND INCOMPACTNESS PHENOMENA IN SET THEORY
• Some independence results on reflection James Cummings
• Possible behaviours for the Mitchell ordering II James Cummings
• A consistency result on weak reflection James Cummings *
• SOUSLIN TREES WHICH ARE HARD TO SPECIALISE JAMES CUMMINGS
• Identity Crises and Strong Compactness II: Strong Cardinals
• Singular cardinal problems James Cummings
• BLOWING UP THE POWER SET OF THE LEAST MEASURABLE
• CANONICAL STRUCTURE IN THE UNIVERSE OF SET THEORY: PART ONE
• THE NON-COMPACTNESS OF SQUARE. JAMES CUMMINGS, MATTHEW FOREMAN, AND MENACHEM MAGIDOR
• INDEXED SQUARES JAMES CUMMINGS AND ERNEST SCHIMMERLING
• COMPACTNESS AND INCOMPACTNESS PHENOMENA IN SET JAMES CUMMINGS
• Arch. Math. Logic (2008) 47:6578 DOI 10.1007/s00153-008-0071-9 Mathematical Logic
• Annals of Pure and Applied Logic 149 (2007) 1424 www.elsevier.com/locate/apal
• THE NON-COMPACTNESS OF SQUARE. JAMES CUMMINGS, MATTHEW FOREMAN, AND MENACHEM MAGIDOR
• Large cardinal properties of small cardinals James Cummings
• INDEXED SQUARES JAMES CUMMINGS AND ERNEST SCHIMMERLING
• SQUARES, SCALES AND STATIONARY REFLECTION JAMES CUMMINGS, MATTHEW FOREMAN, AND MENACHEM
• "Identity Crises and Strong Compactness" by
• THE NON-COMPACTNESS OF SQUARE. JAMES CUMMINGS, MATTHEW FOREMAN, AND MENACHEM MAGIDOR
• A MODEL IN WHICH GCH HOLDS AT SUCCESSORS BUT FAILS AT LIMITS
• COLLAPSING SUCCESSORS OF SINGULARS JAMES CUMMINGS
• A MODEL IN WHICH EVERY BOOLEAN ALGEBRA HAS MANY SUBALGEBRAS
• ON THE SINGULAR CARDINALS JAMES CUMMINGS AND SY-DAVID FRIEDMAN
• Possible behaviours for the Mitchell ordering II James Cummings
• THE TREE PROPERTY JAMES CUMMINGS AND MATTHEW FOREMAN
• Some independence results on re ection James Cummings
• CONTINUOUS TREE-LIKE SCALES JAMES CUMMINGS
• Singular cardinal problems James Cummings
• ORGANIC AND TIGHT J. CUMMINGS, M. FOREMAN, AND E. SCHIMMERLING
• Journal of Combinatorics Volume 0, Number 0, 18, 0000
• Possible behaviours for the Mitchell ordering James Cummings
• A MODEL IN WHICH EVERY BOOLEAN ALGEBRA HAS MANY SUBALGEBRAS
• Coherent sequences versus Radin sequences James Cummings
• COLLAPSING SUCCESSORS OF SINGULARS JAMES CUMMINGS
• A consistency result on weak re ection James Cummings
• Large cardinal properties of small cardinals James Cummings
• Cardinal invariants above the continuum James Cummings
• A MODEL IN WHICH GCH HOLDS AT SUCCESSORS BUT FAILS AT LIMITS
• Strong ultrapowers and long core models James Cummings, MIT