- Claw-free Graphs. I. Orientable prismatic graphs Maria Chudnovsky1
- K 4 free graphs with no odd holes Maria Chudnovsky 1
- Solution of three problems of Cornuejols Maria Chudnovsky 1
- Paul Seymour --Curriculum Vitae Birth: July 26, 1950, Plymouth, England.
- Graph Minors. XXI. Graphs with unique linkages Neil Robertson 1
- Cycles in dense digraphs Maria Chudnovsky 1
- A wellquasiorder for tournaments Maria Chudnovsky 1
- How the proof of the strong perfect graph conjecture was found Paul Seymour 1
- PROPER MINOR-CLOSED FAMILIES ARE SMALL Serguei Norine
- The Strong Perfect Graph Theorem Maria Chudnovsky
- Clawfree Graphs. III. Circular interval graphs Maria Chudnovsky 1
- Cut Coloring and Circuit Covering Matt DeVos #
- Paul Seymour Papers Revised November 9, 2010
- Detecting even holes Maria Chudnovsky 1 Kenichi Kawarabayashi 2
- Claw-free Graphs VI. Colouring Maria Chudnovsky
- The Roots of the Independence Polynomial of a Clawfree Graph Maria Chudnovsky 1 and Paul Seymour 2
- PROPER MINORCLOSED FAMILIES ARE SMALL Serguei Norine
- Clawfree Graphs. I. Orientable prismatic graphs Maria Chudnovsky 1
- Graph minors XX. Wagner's conjecture
- Tournament immersion and cutwidth Maria Chudnovsky1
- APPROXIMATING CLIQUEWIDTH AND BRANCHWIDTH SANGIL OUM AND PAUL SEYMOUR
- Perfect Matchings in Planar Cubic Graphs Maria Chudnovsky 1
- Packing seagulls Maria Chudnovsky 1
- Tournament immersion and cutwidth Maria Chudnovsky 1
- Clawfree Graphs. V. Global structure Maria Chudnovsky 1
- Finding minimum clique capacity Maria Chudnovsky1
- Even Pairs In Berge Graphs Maria Chudnovsky 1
- Paul Seymour Curriculum Vitae Birth: July 26, 1950, Plymouth, England.
- Graph Minors. XXI. Graphs with unique linkages Neil Robertson1
- Graph Minors. XXII. Irrelevant vertices in linkage problems Neil Robertson1
- Claw-free Graphs. III. Circular interval graphs Maria Chudnovsky1
- Claw-free Graphs. V. Global structure Maria Chudnovsky1
- Claw-free Graphs. VII. Quasi-line graphs Maria Chudnovsky1
- Counting Paths in Digraphs Paul Seymour 1
- The structure of claw-free graphs Maria Chudnovsky and Paul Seymour
- Hadwiger's conjecture for line graphs Equipe Combinatoire, Case 189,
- Certifying Large Branch-width Sang-il Oum
- On the odd-minor variant of Hadwiger's conjecture , Bert Gerards
- Cycles in dense digraphs Maria Chudnovsky1
- Cut Coloring and Circuit Covering matdevos@math.princeton.edu
- K4-free graphs with no odd holes Maria Chudnovsky1
- A well-quasi-order for tournaments Maria Chudnovsky1
- The edge-density for K2,t minors Maria Chudnovsky1
- Hadwiger's conjecture for line graphs Equipe Combinatoire, Case 189,
- How the proof of the strong perfect graph conjecture was found Paul Seymour1
- Clawfree Graphs. IV. Decomposition theorem Maria Chudnovsky 1
- Clawfree Graphs VI. Colouring Maria Chudnovsky
- Graph minors XX. Wagner's conjecture
- The edgedensity for K 2,t minors Maria Chudnovsky 1
- Counting Paths in Digraphs Paul Seymour 1 Blair D. Sullivan #,2
- Claw-free Graphs. II. Non-orientable prismatic graphs Maria Chudnovsky1
- On the oddminor variant of Hadwiger's conjecture Jim Geelen # , Bert Gerards + , Bruce Reed # , Paul Seymour Adrian Vetta
- The threeinatree problem Maria Chudnovsky 1 and Paul Seymour 2
- The Strong Perfect Graph Theorem Maria Chudnovsky
- The structure of clawfree graphs Maria Chudnovsky and Paul Seymour
- Finding minimum clique capacity Maria Chudnovsky 1
- APPROXIMATING CLIQUE-WIDTH AND BRANCH-WIDTH SANG-IL OUM AND PAUL SEYMOUR
- Packing seagulls Maria Chudnovsky1
- Graph Minors. XXII. Irrelevant vertices in linkage problems Neil Robertson 1
- Excluding induced subgraphs Maria Chudnovsky and Paul Seymour
- The three-in-a-tree problem Maria Chudnovsky1
- Even Pairs In Berge Graphs Maria Chudnovsky1
- Clawfree Graphs. II. Nonorientable prismatic graphs Maria Chudnovsky 1
- Certifying Large Branchwidth Sangil Oum # Paul Seymour +#
- Detecting even holes Maria Chudnovsky1
- Paul Seymour --Papers Revised November 9, 2010
- Excluding induced subgraphs Maria Chudnovsky and Paul Seymour
- Graph Minors XXIII. Nash-Williams' immersion conjecture
- Claw-free Graphs. IV. Decomposition theorem Maria Chudnovsky1
- Solution of three problems of Cornuejols Maria Chudnovsky1
- Clawfree Graphs. VII. Quasiline graphs Maria Chudnovsky 1
- Graph Minors XXIII. NashWilliams' immersion conjecture
- A Bound on for Graphs in Forb Irena Penev
