List of conjectures
This is a list of mathematical conjectures.
Open problems
Conjectures now proved (theorems)
The conjecture terminology may persist: theorems often enough may still be referred to as conjectures, using the anachronistic names.| Priority date | Proved by | Former name | Field | Comments |
| 1962 | Walter Feit, John Thompson | Burnside conjecture that, apart from cyclic groups, finite simple groups have even order | finite simple groups | Feit–Thompson theorem⇔trivially the "odd order theorem" that finite groups of odd order are solvable groups |
| 1968 | Gerhard Ringel and Ted Youngs | Heawood conjecture | graph theory | Ringel-Youngs theorem |
| 1971 | Daniel Quillen | Adams conjecture | algebraic topology | On the J-homomorphism, proposed 1963 by Frank Adams |
| 1973 | Pierre Deligne | Weil conjectures | algebraic geometry | ⇒Ramanujan–Petersson conjecture Proposed by André Weil. Deligne's theorems completed around 15 years of work on the general case. |
| 1975 | Henryk Hecht and Wilfried Schmid | Blattner's conjecture | representation theory for semisimple groups | |
| 1975 | William Haboush | Mumford conjecture | geometric invariant theory | Haboush's theorem |
| 1976 | Kenneth Appel and Wolfgang Haken | Four color theorem | graph colouring | Traditionally called a "theorem", long before the proof. |
| 1976 | Daniel Quillen and Andrei Suslin independently | Serre's conjecture on projective modules | polynomial rings | Quillen–Suslin theorem |
| 1977 | Alberto Calderón | Denjoy's conjecture | rectifiable curves | A result claimed in 1909 by Arnaud Denjoy, proved by Calderón as a by-product of work on Cauchy singular operators |
| 1978 | Roger Heath-Brown and S. J. Patterson | Kummer's conjecture on cubic Gauss sums | equidistribution | |
| 1983 | Gerd Faltings | Mordell conjecture | number theory | ⇐Faltings's theorem, the Shafarevich conjecture on finiteness of isomorphism classes of abelian varieties. The reduction step was by Alexey Parshin. |
| 1983 onwards | Neil Robertson and Paul D. Seymour | Wagner's conjecture | graph theory | Now generally known as the graph minor theorem. |
| 1983 | Michel Raynaud | Manin–Mumford conjecture | diophantine geometry | The Tate–Voloch conjecture is a quantitative derived conjecture for p-adic varieties. |
| c.1984 | Collective work | Smith conjecture | knot theory | Based on work of William Thurston on hyperbolic structures on 3-manifolds, with results by William Meeks and Shing-Tung Yau on minimal surfaces in 3-manifolds, also with Hyman Bass, Cameron Gordon, Peter Shalen, and Rick Litherland, written up by Bass and John Morgan. |
| 1984 | Louis de Branges | Bieberbach conjecture, 1916 | complex analysis | ⇐Robertson conjecture⇐Milin conjecture⇐de Branges's theorem |
| 1984 | Gunnar Carlsson | Segal's conjecture | homotopy theory | |
| 1984 | Haynes Miller | Sullivan conjecture | classifying spaces | Miller proved the version on mapping BG to a finite complex. |
| 1987 | Grigory Margulis | Oppenheim conjecture | diophantine approximation | Margulis proved the conjecture with ergodic theory methods. |
| 1989 | V. I. Chernousov | Weil's conjecture on Tamagawa numbers | algebraic groups | The problem, based on Siegel's theory for quadratic forms, submitted to a long series of case analysis steps. |
| 1990 | Ken Ribet | epsilon conjecture | modular forms | |
| 1992 | Richard Borcherds | Conway–Norton conjecture | sporadic groups | Usually called monstrous moonshine |
| 1994 | David Harbater and Michel Raynaud | Abhyankar's conjecture | algebraic geometry | |
| 1994 | Andrew Wiles | Fermat's Last Theorem | number theory | ⇔The modularity theorem for semistable elliptic curves. Proof completed with Richard Taylor. |
| 1994 | Fred Galvin | Dinitz conjecture | combinatorics | |
| 1995 | Doron Zeilberger | Alternating sign matrix conjecture, | enumerative combinatorics | |
| 1996 | Vladimir Voevodsky | Milnor conjecture | algebraic K-theory | Voevodsky's theorem, ⇐norm residue isomorphism theorem⇔Beilinson–Lichtenbaum conjecture, Quillen–Lichtenbaum conjecture. The ambiguous term "Bloch-Kato conjecture" may refer to what is now the norm residue isomorphism theorem. |
| 1998 | Thomas Callister Hales | Kepler conjecture | sphere packing | |
| 1998 | Thomas Callister Hales and Sean McLaughlin | dodecahedral conjecture | Voronoi decompositions | |
| 2000 | Krzysztof Kurdyka, Tadeusz Mostowski and Adam Parusiński | Gradient conjecture | gradient vector fields | Attributed to René Thom, c.1970. |
| 2001 | Christophe Breuil, Brian Conrad, Fred Diamond and Richard Taylor | Taniyama–Shimura conjecture | elliptic curves | Now the modularity theorem for elliptic curves. Once known as the "Weil conjecture". |
| 2001 | Mark Haiman | n! conjecture | representation theory | |
| 2001 | Daniel Frohardt and Kay Magaard | Guralnick–Thompson conjecture | monodromy groups | |
| 2002 | Preda Mihăilescu | Catalan's conjecture, 1844 | exponential diophantine equations | ⇐Pillai's conjecture⇐abc conjecture Mihăilescu's theorem |
| 2002 | Maria Chudnovsky, Neil Robertson, Paul Seymour, and Robin Thomas | strong perfect graph conjecture | perfect graphs | Chudnovsky–Robertson–Seymour–Thomas theorem |
| 2002 | Grigori Perelman | Poincaré conjecture, 1904 | 3-manifolds | |
| 2003 | Grigori Perelman | geometrization conjecture of Thurston | 3-manifolds | ⇒spherical space form conjecture |
| 2003 | Ben Green; and independently by Alexander Sapozhenko | Cameron–Erdős conjecture | sum-free sets | |
| 2003 | Nils Dencker | Nirenberg–Treves conjecture | pseudo-differential operators | |
| 2004 | Nobuo Iiyori and Hiroshi Yamaki | Frobenius conjecture | group theory | A consequence of the classification of finite simple groups, completed in 2004 by the usual standards of pure mathematics. |
| 2004 | Adam Marcus and Gábor Tardos | Stanley–Wilf conjecture | permutation classes | Marcus–Tardos theorem |
| 2004 | Ualbai U. Umirbaev and Ivan P. Shestakov | Nagata's conjecture on automorphisms | polynomial rings | |
| 2004 | Ian Agol and independently by Danny Calegari–David Gabai | tameness conjecture | geometric topology | ⇒Ahlfors measure conjecture |
| 2008 | Avraham Trahtman | Road coloring conjecture | graph theory | |
| 2008 | Chandrashekhar Khare, Jean-Pierre Wintenberger | Serre's modularity conjecture | modular forms | |
| 2009 | Jeremy Kahn, Vladimir Markovic | surface subgroup conjecture | 3-manifolds | ⇒Ehrenpreis conjecture on quasiconformality |
| 2009 | Jeremie Chalopin and Daniel Gonçalves | Scheinerman's conjecture | intersection graphs | |
| 2010 | Terence Tao and Van H. Vu | circular law | random matrix theory | |
| 2011 | Joel Friedman and Igor Mineyev, independently | Hanna Neumann conjecture | group theory | |
| 2012 | Simon Brendle | Hsiang–Lawson's conjecture | differential geometry | |
| 2012 | Fernando Codá Marques and André Neves | Willmore conjecture | differential geometry | |
| 2013 | Zhang Yitang | bounded gap conjecture | number theory | The sequence of gaps between consecutive prime numbers has a finite lim inf. See Polymath Project#Polymath8 for quantitative results. |
| 2013 | Adam Marcus, Daniel Spielman and Nikhil Srivastava | Kadison–Singer problem | functional analysis | The original problem posed by Kadison and Singer was not a conjecture: its authors believed it false. As reformulated, it became the "paving conjecture" for Euclidean spaces, and then a question on random polynomials, in which latter form it was solved affirmatively. |
| 2015 | Jean Bourgain, Ciprian Demeter, and Larry Guth | Main conjecture in Vinogradov's mean-value theorem | analytic number theory | Bourgain–Demeter–Guth theorem, ⇐ decoupling theorem |
| 2019 | Dimitris Koukoulopoulos and James Maynard | Duffin–Schaeffer conjecture | number theory | Rational approximation of irrational numbers |
- Deligne's conjecture on 1-motives
- Goldbach's weak conjecture
- Sensitivity conjecture
Disproved (no longer conjectures)
- Atiyah conjecture
- Borsuk's conjecture
- Chinese hypothesis
- Doomsday conjecture
- Euler's sum of powers conjecture
- Ganea conjecture
- Generalized Smith conjecture
- Hauptvermutung
- Hedetniemi's conjecture, counterexample announced 2019
- Hirsch conjecture
- Intersection graph conjecture
- Kelvin's conjecture
- Kouchnirenko's conjecture
- Mertens conjecture
- Pólya conjecture, 1919
- Ragsdale conjecture
- Schoenflies conjecture
- Tait's conjecture
- Von Neumann conjecture
- Weyl–Berry conjecture
- Williamson conjecture