-
value of n {\displaystyle n}
greater than two. This
theorem was
first conjectured by
Pierre de
Fermat in 1637 in the
margin of a copy of Arithmetica, where...
- Conversely, it is
conjectured that
every rational with an odd
denominator has an
eventually cyclic parity sequence (Periodicity
Conjecture). If a
parity cycle...
- had also
conjectured H****e's
theorem on
elliptic curves This
disambiguation page
lists articles ****ociated with the
title Artin conjecture. If an internal...
- In
number theory and
algebraic geometry, the Tate
conjecture is a 1963
conjecture of John Tate that
would describe the
algebraic cycles on a
variety in...
- disproven, it had been
shown to
imply the
Riemann hypothesis. It was
conjectured by
Thomas Joannes Stieltjes, in an 1885
letter to
Charles Hermite (reprinted...
- Serre's
conjecture may
refer to: Quillen–Suslin theorem,
formerly known as Serre's
conjecture Serre's
conjecture II,
concerning the
Galois cohomology of...
-
Hardy and John
Edensor Littlewood in 1923
conjectured (as part of
their Hardy–Littlewood
prime tuple conjecture) that for any
fixed c ≥ 2, the
number of...
-
hypersphere that
bounds the unit ball in four-dimensional space.
Originally conjectured by
Henri Poincaré in 1904, the
theorem concerns spaces that
locally look...
- Catalan's
conjecture (or Mihăilescu's theorem) is a
theorem in
number theory that was
conjectured by the
mathematician Eugène
Charles Catalan in 1844...
- In
number theory, Szpiro's
conjecture relates to the
conductor and the
discriminant of an
elliptic curve. In a
slightly modified form, it is equivalent...
