List of unsolved problems in mathematics

Since the Renaissance, every century has seen the solution of more mathematical problems than the century before, and yet many mathematical problems, both major and minor, still elude solution.^[1]

An unsolved problem in mathematics does not refer to the kind of problem found as an exercise in a textbook, but rather to the answer to a major question or a general method that provides a solution to an entire class of problems. Prizes are often awarded for the solution to a long-standing problem, and lists of unsolved problems receive considerable attention. This article reiterates the list of Millennium Prize Problems of unsolved problems in mathematics (includes problems of physics and computer science) as of August 2015, and lists further unsolved problems in algebra, additive and algebraic number theories, analysis, combinatorics, algebraic, discrete, and Euclidean geometries, dynamical systems, partial differential equations, and graph, group, model, number, set and Ramsey theories, as well as miscellaneous unsolved problems. A list of problems solved since 1995 also appears, alongside some sources, general and specific, for the stated problems.

Lists of unsolved problems in mathematics

Over the course of time, several lists of unsolved mathematical problems have appeared. The following is a listing of those lists.

List	Number of problems	Proposed by	Proposed in
Hilbert's problems	23	David Hilbert	1900
Landau's problems	4	Edmund Landau	1912
Taniyama's problems^[2]	36	Yutaka Taniyama	1955
Thurston's 24 questions^[3]^[4]	24	William Thurston	1982
Smale's problems	18	Stephen Smale	1998
Millennium Prize problems	7	Clay Mathematics Institute	2000
Unsolved Problems on Mathematics for the 21st Century^[5]	22	Jair Minoro Abe, Shotaro Tanaka	2001
DARPA's math challenges^[6]^[7]	23	DARPA	2007

Millennium Prize Problems

Of the original seven Millennium Prize Problems set by the Clay Mathematics Institute, six have yet to be solved, as of 2016:^[8]

The seventh problem, the Poincaré conjecture, has been solved.^[9] The smooth four-dimensional Poincaré conjecture—that is, whether a four-dimensional topological sphere can have two or more inequivalent smooth structures—is still unsolved.^[10]

Unsolved problems

Combinatorics

Number of magic squares (sequence A006052 in OEIS)
Number of magic tori (sequence A270876 in OEIS)
Finding a formula for the probability that two elements chosen at random generate the symmetric group $S_n$
Frankl's union-closed sets conjecture: for any family of sets closed under sums there exists an element (of the underlying space) belonging to half or more of the sets
The lonely runner conjecture: if $k+1$ runners with pairwise distinct speeds run round a track of unit length, will every runner be "lonely" (that is, be at least a distance $1/(k+1)$ from each other runner) at some time?
Singmaster's conjecture: is there a finite upper bound on the multiplicities of the entries greater than 1 in Pascal's triangle?
The 1/3–2/3 conjecture: does every finite partially ordered set that is not totally ordered contain two elements x and y such that the probability that x appears before y in a random linear extension is between 1/3 and 2/3?
unicity conjecture for Markov numbers
balance puzzle ^[14]

Discrete geometry

Solving the happy ending problem for arbitrary $n$
Finding matching upper and lower bounds for k-sets and halving lines
The Hadwiger conjecture on covering n-dimensional convex bodies with at most 2ⁿ smaller copies
The Kobon triangle problem on triangles in line arrangements
The McMullen problem on projectively transforming sets of points into convex position
Ulam's packing conjecture about the identity of the worst-packing convex solid
Filling area conjecture
Hopf conjecture
Kakeya conjecture

Euclidean geometry

The einstein problem – does there exist a two-dimensional shape that forms the prototile for an aperiodic tiling, but not for any periodic tiling?^[15]
Inscribed square problem – does every Jordan curve have an inscribed square?^[16]
Moser's worm problem – what is the smallest area of a shape that can cover every unit-length curve in the plane?^[17]
The moving sofa problem – what is the largest area of a shape that can be maneuvered through a unit-width L-shaped corridor?^[18]
Shephard's problem (a.k.a. Dürer's conjecture) – does every convex polyhedron have a net?^[19]
The Thomson problem - what is the minimum energy configuration of N particles bound to the surface of a unit sphere that repel each other with a 1/r potential (or any potential in general)?
Pentagonal tiling - 15 types of convex pentagons are known to monohedrally tile the plane, and it is not known whether this list is complete.^[20]
Falconer's conjecture
g-conjecture
Circle packing in an equilateral triangle
Circle packing in an isosceles right triangle

Dynamical systems

Furstenberg conjecture – Is every invariant and ergodic measure for the $\times 2,\times 3$ action on the circle either Lebesgue or atomic?
Margulis conjecture — Measure classification for diagonalizable actions in higher-rank groups
MLC conjecture – Is the Mandelbrot set locally connected ?
Weinstein conjecture - Does a regular compact contact type level set of a Hamiltonian on a symplectic manifold carry at least one periodic orbit of the Hamiltonian flow?
Is every reversible cellular automaton in three or more dimensions locally reversible?^[21]

Graph theory

Barnette's conjecture that every cubic bipartite three-connected planar graph has a Hamiltonian cycle
The Erdős–Gyárfás conjecture on cycles with power-of-two lengths in cubic graphs
The Erdős–Hajnal conjecture on finding large homogeneous sets in graphs with a forbidden induced subgraph
The Hadwiger conjecture relating coloring to clique minors
The Erdős–Faber–Lovász conjecture on coloring unions of cliques
Harborth's conjecture that every planar graph can be drawn with integer edge lengths
The total coloring conjecture
Hadwiger conjecture (graph theory)
The list coloring conjecture
The Ringel–Kotzig conjecture on graceful labeling of trees
How many unit distances can be determined by a set of n points? (see Counting unit distances)
The Hadwiger–Nelson problem on the chromatic number of unit distance graphs
Lovász conjecture
Deriving a closed-form expression for the percolation threshold values, especially $p_c$ (square site)
Tutte's conjectures that every bridgeless graph has a nowhere-zero 5-flow and every bridgeless graph without the Petersen graph as a minor has a nowhere-zero 4-flow
Petersen coloring conjecture
The reconstruction conjecture and new digraph reconstruction conjecture concerning whether or not a graph is recognizable by the vertex deleted subgraphs.
The cycle double cover conjecture that every bridgeless graph has a family of cycles that includes each edge twice.
Does a Moore graph with girth 5 and degree 57 exist?
Conway's thrackle conjecture
Negami's conjecture on the characterization of graphs with planar covers
The Blankenship–Oporowski conjecture on the book thickness of subdivisions
Hedetniemi's conjecture
Vizing's conjecture

Group theory

Is every finitely presented periodic group finite?
The inverse Galois problem: is every finite group the Galois group of a Galois extension of the rationals?
For which positive integers m, n is the free Burnside group B(m,n) finite? In particular, is B(2, 5) finite?
Is every group surjunctive?
Andrews–Curtis conjecture
Herzog–Schönheim conjecture
Does generalized moonshine exist?

Model theory

Vaught's conjecture
The Cherlin–Zilber conjecture: A simple group whose first-order theory is stable in $\aleph_0$ is a simple algebraic group over an algebraically closed field.
The Main Gap conjecture, e.g. for uncountable first order theories, for AECs, and for $\aleph_1$ -saturated models of a countable theory.^[22]
Determine the structure of Keisler's order^[23]^[24]
The stable field conjecture: every infinite field with a stable first-order theory is separably closed.
Is the theory of the field of Laurent series over $\mathbb{Z}_p$ decidable? of the field of polynomials over $\mathbb{C}$ ?
(BMTO) Is the Borel monadic theory of the real order decidable? (MTWO) Is the monadic theory of well-ordering consistently decidable?^[25]
The Stable Forking Conjecture for simple theories^[26]
For which number fields does Hilbert's tenth problem hold?
Assume K is the class of models of a countable first order theory omitting countably many types. If K has a model of cardinality $\aleph_{\omega_1}$ does it have a model of cardinality continuum?^[27]
Shelah's eventual Categority conjecture: For every cardinal \lambda there exists a cardinal \mu(\lambda) such that If an AEC K with LS(K)<= \lambda is categorical in a cardinal above \mu(\lambda) then it is categorical in all cardinals above \mu(\lambda).^[22]^[28]
Shelah's categoricity conjecture for L_{\omega_1,\omega}: If a sentence is categorical above the Hanf number then it is categorical in all cardinals above the Hanf number.^[22]
Is there a logic L which satisfies both the Beth property and Δ-interpolation, is compact but does not satisfy the interpolation property?^[29]
If the class of atomic models of a complete first order theory is categorical in the $\aleph_n$ , is it categorical in every cardinal?^[30]^[31]
Is every infinite, minimal field of characteristic zero algebraically closed? (minimal = no proper elementary substructure)
Kueker's conjecture^[32]
Does there exist an o-minimal first order theory with a trans-exponential (rapid growth) function?
Lachlan's decision problem
Does a finitely presented homogeneous structure for a finite relational language have finitely many reducts?
Do the Henson graphs have the finite model property? (e.g. triangle-free graphs)
The universality problem for C-free graphs: For which finite sets C of graphs does the class of C-free countable graphs have a universal member under strong embeddings?^[33]
The universality spectrum problem: Is there a first-order theory whose universality spectrum is minimum?^[34]

Number theory (general)

Grand Riemann hypothesis
- Generalized Riemann hypothesis
  - Riemann hypothesis
n conjecture
- abc conjecture (Proof claimed in 2012, currently under review.)
Hilbert's ninth problem
Hilbert's eleventh problem
Hilbert's twelfth problem
Carmichael's totient function conjecture
Erdős–Straus conjecture
Pillai's conjecture
Hall's conjecture
Lindelöf hypothesis
Montgomery's pair correlation conjecture
Hilbert–Pólya conjecture
Grimm's conjecture
Leopoldt's conjecture
Do any odd perfect numbers exist?
Are there infinitely many perfect numbers?
Do quasiperfect numbers exist?
Do any odd weird numbers exist?
Do any Lychrel numbers exist?
Is 10 a solitary number?
Catalan–Dickson conjecture on aliquot sequences
Do any Taxicab(5, 2, n) exist for n>1?
Brocard's problem: existence of integers, (n,m), such that n!+1 = m² other than n=4, 5, 7
Beilinson conjecture
Littlewood conjecture
Szpiro's conjecture
Vojta's conjecture
Goormaghtigh conjecture
Congruent number problem (a corollary to Birch and Swinnerton-Dyer conjecture, per Tunnell's theorem)
Lehmer's totient problem: if φ(n) divides n − 1, must n be prime?
Are there infinitely many amicable numbers?
Are there any pairs of amicable numbers which have opposite parity?
Are there any pairs of relatively prime amicable numbers?
Are there infinitely many betrothed numbers?
Are there any pairs of betrothed numbers which have same parity?
The Gauss circle problem – how far can the number of integer points in a circle centered at the origin be from the area of the circle?
Is π a normal number (its digits are "random")?^[35]
Casas-Alvero conjecture
Sato–Tate conjecture
Find value of De Bruijn–Newman constant

Number theory (prime numbers)

Prime number conjectures

Hardy–Littlewood 1st 2nd Agoh–Giuga Andrica's Artin's Bateman–Horn Brocard's Bunyakovsky Chinese hypothesis Cramér's Dickson's Elliott–Halberstam Firoozbakht's Gilbreath's Grimm's Landau's problems Goldbach's weak Legendre's Twin prime Legendre's constant Lemoine's Mersenne Oppermann's Polignac's Pólya Redmond–Sun Schinzel's hypothesis H Waring's prime number

Catalan's Mersenne conjecture
Agoh–Giuga conjecture
The Gaussian moat problem: is it possible to find an infinite sequence of distinct Gaussian prime numbers such that the difference between consecutive numbers in the sequence is bounded?
New Mersenne conjecture
Erdős–Mollin–Walsh conjecture
Are there infinitely many prime quadruplets?
Are there infinitely many cousin primes?
Are there infinitely many sexy primes?
Are there infinitely many Mersenne primes (Lenstra–Pomerance–Wagstaff conjecture); equivalently, infinitely many even perfect numbers?
Are there infinitely many Wagstaff primes?
Are there infinitely many Sophie Germain primes?
Are there infinitely many Pierpont primes?
Are there infinitely many regular primes, and if so is their relative density $e^{-1/2}$ ?
Are there infinitely many repunit primes to every base except perfect power and numbers of the form -4k⁴?
Are there infinitely many Cullen primes?
Are there infinitely many Woodall primes?
Are there infinitely many palindromic primes to every base?
Are there infinitely many Fibonacci primes?
Are there infinitely many Lucas primes?
Are there infinitely many Pell primes?
Are there infinitely many Newman–Shanks–Williams primes?
Are all Mersenne numbers of prime index square-free?
Are there infinitely many Wieferich primes?
Are there any Wieferich primes in base 47?
Are there any composite c satisfying 2^{c - 1} ≡ 1 (mod c²)?
For any given integer a > 0, are there infinitely many primes p such that a^{p - 1} ≡ 1 (mod p²)?^[36]
Can a prime p satisfy 2^p − 1 ≡ 1 (mod p²) and 3^p − 1 ≡ 1 (mod p²) simultaneously?^[37]
Are there infinitely many Wilson primes?
Are there infinitely many Wolstenholme primes?
Are there any Wall–Sun–Sun primes?
Is every Fermat number 2^2ⁿ + 1 composite for $n > 4$ ?
Are all Fermat numbers square-free?
For any given integer a which is not a square and does not equal to -1, are there infinitely many primes with a as a primitive root?
Artin's conjecture on primitive roots
Is 78,557 the lowest Sierpiński number (so-called Selfridge's conjecture)?
Is 509,203 the lowest Riesel number?
Fortune's conjecture (that no Fortunate number is composite)
Landau's problems
Does every prime number appear in the Euclid–Mullin sequence?
Does the converse of Wolstenholme's theorem hold for all natural numbers?
Elliott–Halberstam conjecture
Problems associated to Linnik's theorem

Partial differential equations

Regularity of solutions of Vlasov–Maxwell equations
Regularity of solutions of Euler equations

Ramsey theory

The values of the Ramsey numbers, particularly $R(5, 5)$
The values of the Van der Waerden numbers
Erdős–Burr conjecture

Set theory

The problem of finding the ultimate core model, one that contains all large cardinals.
If ℵ_ω is a strong limit cardinal, then 2^ℵ_ω < ℵ_ω₁ (see Singular cardinals hypothesis). The best bound, ℵ_ω₄, was obtained by Shelah using his pcf theory.
Woodin's Ω-hypothesis.
Does the consistency of the existence of a strongly compact cardinal imply the consistent existence of a supercompact cardinal?
(Woodin) Does the Generalized Continuum Hypothesis below a strongly compact cardinal imply the Generalized Continuum Hypothesis everywhere?
Does there exist a Jónsson algebra on ℵ_ω?
Without assuming the axiom of choice, can a nontrivial elementary embedding V→V exist?
Does the Generalized Continuum Hypothesis entail ${\diamondsuit(E^{\lambda^+}_{cf(\lambda)}})$ for every singular cardinal $\lambda$ ?
Does the Generalized Continuum Hypothesis imply the existence of an ℵ₂-Suslin tree?

Other

Problems solved since 1995

Main conjecture in Vinogradov's mean-value theorem (Jean Bourgain, Ciprian Demeter, Larry Guth, 2015)^[39]
Erdős discrepancy problem (Terence Tao, 2015)^[40]
Umbral moonshine conjecture (John F. R. Duncan, Michael J. Griffin, Ken Ono, 2015)^[41]
Anderson conjecture (Cheeger, Naber, 2014)^[42]
Goldbach's weak conjecture (Harald Helfgott, 2013)^[43]^[44]^[45]
Kadison–Singer problem (Adam Marcus, Daniel Spielman and Nikhil Srivastava, 2013)^[46]^[47] (and the Feichtinger's conjecture, Anderson’s paving conjectures, Weaver’s discrepancy theoretic $KS_r$ and $KS'_r$ conjectures, Bourgain-Tzafriri conjecture and $R_\epsilon$ -conjecture)
Virtual Haken conjecture (Agol, Groves, Manning, 2012)^[48] (and by work of Wise also virtually fibered conjecture)
Hsiang–Lawson's conjecture (Brendle, 2012)^[49]
Willmore conjecture (Fernando Codá Marques and André Neves, 2012)^[50]
Ehrenpreis conjecture (Kahn, Markovic, 2011)^[51]
Hanna Neumann conjecture (Mineyev, 2011)^[52]
Bloch–Kato conjecture (Voevodsky, 2011)^[53] (and Quillen–Lichtenbaum conjecture and by work of Geisser and Levine (2001) also Beilinson–Lichtenbaum conjecture^[54]^[55]^[56])
Erdős distinct distances problem (Larry Guth, Netz Hawk Katz, 2011)^[57]
Density theorem (Namazi, Souto, 2010)^[58]
Hirsch conjecture (Francisco Santos Leal, 2010)^[59]^[60]
Sidon set problem (J. Cilleruelo, I. Ruzsa and C. Vinuesa, 2010)^[61]
Atiyah conjecture (Austin, 2009)^[62]
Kauffman–Harary conjecture (Matmann, Solis, 2009)^[63]
Surface subgroup conjecture (Kahn, Markovic, 2009)^[64]
Scheinerman's conjecture (Jeremie Chalopin and Daniel Gonçalves, 2009)^[65]
Geometrization conjecture (proof was completed by Morgan and Tian in 2008^[66] and it is based mostly on work of Grigori Perelman, 2002)^[67]
Serre's modularity conjecture (Chandrashekhar Khare and Jean-Pierre Wintenberger, 2008)^[68]^[69]^[70]
Heterogeneous tiling conjecture (squaring the plane) (Frederick V. Henle and James M. Henle, 2008)^[71]
Erdős–Menger conjecture (Aharoni, Berger 2007)^[72]
Road coloring conjecture (Avraham Trahtman, 2007)^[73]
The angel problem (Various independent proofs, 2006)^[74]^[75]^[76]^[77]
Lax conjecture (Lewis, Parrilo, Ramana, 2005)^[78]
The Langlands–Shelstad fundamental lemma (Ngô Bảo Châu and Gérard Laumon, 2004)^[79]
Tameness conjecture and Ahlfors measure conjecture (Ian Agol, 2004)^[80]
Robertson–Seymour theorem (Robertson, Seymour, 2004)^[81]
Stanley–Wilf conjecture (Gábor Tardos and Adam Marcus, 2004)^[82] (and also Alon–Friedgut conjecture)
Green–Tao theorem (Ben J. Green and Terence Tao, 2004)^[83]
Ending lamination theorem (Jeffrey F. Brock, Richard D. Canary, Yair N. Minsky, 2004)^[84]
Cameron–Erdős conjecture (Ben J. Green, 2003, Alexander Sapozhenko, 2003)^[85]^[86]
Milnor conjecture (Vladimir Voevodsky, 2003)^[87]
Kemnitz's conjecture (Reiher, 2003, di Fiore, 2003)^[88]
Nagata's conjecture (Shestakov, Umirbaev, 2003)^[89]
Kirillov's conjecture (Baruch, 2003)^[90]
Poincaré conjecture (Grigori Perelman, 2002)^[67]
Strong perfect graph conjecture (Maria Chudnovsky, Neil Robertson, Paul Seymour and Robin Thomas, 2002)^[91]
Kouchnirenko’s conjecture (Haas, 2002)^[92]
Vaught conjecture (Knight, 2002)^[93]
Double bubble conjecture (Hutchings, Morgan, Ritoré, Ros, 2002)^[94]
Catalan's conjecture (Preda Mihăilescu, 2002)^[95]
n! conjecture (Haiman, 2001)^[96] (and also Macdonald positivity conjecture)
Kato's conjecture (Auscher, Hofmann, Lacey, McIntosh and Tchamitchian, 2001)^[97]
Deligne's conjecture on 1-motives (Luca Barbieri-Viale, Andreas Rosenschon, Morihiko Saito, 2001)^[98]
Modularity theorem (Breuil, Conrad, Diamond and Taylor, 2001)^[99]
Erdős–Stewart conjecture (Florian Luca, 2001)^[100]
Berry–Robbins problem (Atiyah, 2000)^[101]
Erdős–Graham problem (Croot, 2000)^[102]
Honeycomb conjecture (Thomas Hales, 1999)^[103]
Gradient conjecture (Krzysztof Kurdyka, Tadeusz Mostowski, Adam Parusinski, 1999)^[104]
Bogomolov conjecture (Emmanuel Ullmo, 1998, Shou-Wu Zhang, 1998)^[105]^[106]
Lafforgue's theorem (Laurent Lafforgue, 1998)^[107]
Kepler conjecture (Ferguson, Hales, 1998)^[108]
Dodecahedral conjecture (Hales, McLaughlin, 1998)^[109]
Ganea conjecture (Iwase, 1997)^[110]
Torsion conjecture (Merel, 1996)^[111]
Harary's conjecture (Chen, 1996)^[112]
Fermat's Last Theorem (Andrew Wiles and Richard Taylor, 1995)^[113]^[114]

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