Index: > A B C D E F G H I J K L M N O P Q R S T U V W X Y Z

Home > Catalan's conjecture

Catalan's conjecture is a simple conjecture in number theory that was proposed by the mathematician Eugène Charles Catalan.

To understand the conjecture notice that 2³ = 8 and 3² = 9 are two consecutive powers of natural numbers. Catalan's conjecture states that this is the only case of two consecutive powers.

That is to say, Catalan's conjecture states that the only solution in the natural numbers of

x^a − y^b = 1

for x, a, y, b > 1 is x = 3, a = 2, y = 2, b = 3.

In particular, notice that it's unimportant that the same numbers 2 and 3 are repeated in the equation 3² − 2³ = 1. Even a case where the numbers were not repeated would still be a counterexample to Catalan's conjecture.

Catalan's conjecture was proved by Preda Mihailescu in April 2002, so it is now a theorem. The proof was checked by Yuri Bilu and makes extensive use of the theory of cyclotomic fields and Galois modules.

Pillai's conjecture concerns a general difference of perfect powers. It states that the differences in the sequence of all perfect powers tend to infinity, so that each given difference occurs only finitely many times. It is an open problem as of 2004 and is named for S. S. Pillai.

External links

Ivars Peterson's MathTrek
Metsänkylä, Tauno (2003). Catalan's conjecture: another old Diophantine problem solved, Bull. (New Ser.) Amer. Math. Soc. 41 (1), 43–57.

Number theory Theorems Diophantine equations

Politics	Business	Finance

Topics: Catalan's Conjecture Numbers Powers Theory States Case...

Catalan languageCatalan Catal Valenci is a Romance language spoken by approximately 12 million people in a territory called the Catalan countries which spans portions of Spain, France, Andorra and Italy, although the majority of Catalan speakers are in Spain. Classificat	CatalanCatalan can mean: the Catalan language Eugene Charles Catalan the mathematician inhabitant of Catalonia There is also information on Catalan names.	Catalan's constantCatalan's constant ''K which occasionally appears in estimates in combinatorics, is defined by : or equivalently : Its numerical value is approximately K . 915 965 594 177 219 015 054 603 514 932 384 110 774. It is not known whether K is rational or irrat
Catalan's conjectureCatalan's conjecture is a simple conjecture in number theory that was proposed by the mathematician Eugene Charles Catalan. To understand the conjecture notice that 23 8 and 32 9 are two consecutive powers of natural numbers. Catalan's conjecture states t	Catalan numberThe Catalan numbers named after the Belgian mathematician Eugene Charles Catalan (1814—1894), form a sequence of natural numbers that occur in various counting problems in combinatorics. The n''th Catalan number is defined by : (see binomial coefficient).	Catalan CompanyThe Oriental Catalan Company or the Grand Company, was founded by Roger de Flor (who inspired the medieval tale of Tirant lo Blanc) after the Peace of Caltabellotta in 1302 had left jobless the soldiers from Catalonia and Aragon fighting against the Frenc
Catalan alphabet	Catalan Countries	Catalan nationalism
Catalan grammar	Catalan myths and legends	Catalan literature
Catalan mythology about witches	Catalan solid	Catalan phonology and orthography

Non User