Search for "Conjectures" in article titles:

1. Beilinson conjectures: Let $ X $ be a smooth projective variety (cf. Projective scheme) defined over $ \mathbf Q $. (Mathematics) [100%] 2023-05-13
2. Riesel conjectures: For the original Riesel problem, it is finding and proving the smallest k such that k×b-1 is not prime for all integers n ≥ 1 and GCD(k-1, b-1)=1. Finding and proving the smallest k such ... [100%] 2023-03-25
3. Ravenel conjectures: In mathematics, the Ravenel conjectures are a set of mathematical conjectures in the field of stable homotopy theory posed by Douglas Ravenel at the end of a paper published in 1984. It was earlier circulated in preprint. [100%] 2023-01-17 [Homotopy theory] [Conjectures]...
4. Siepinski conjectures: For the original Sierpinski problem, it is finding and proving the smallest k such that k×b+1 is not prime for all integers n ≥ 1 and GCD(k+1, b-1)=1. Finding and proving the smallest k such ... [100%] 2023-04-13
5. Morita conjectures: The Morita conjectures in general topology are certain problems about normal spaces, now solved in the affirmative. The conjectures, formulated by Kiiti Morita in 1976, asked The answers were believed to be affirmative. [100%] 2023-02-14 [Topology] [Conjectures that have been proved]...
6. Morita conjectures: Three conjectures in general topology due to K. Morita: Here a normal P-space $Y$ is characterised by the property that the product with every metrizable $X$ is normal; it is thus conjectured that the converse holds. (Mathematics) [100%] 2023-10-19
7. Morita conjectures: The Morita conjectures in topology ask Here a normal P-space Y is characterised by the property that the product with every metrizable X is normal; it is thus conjectured that the converse holds. K. [100%] 2023-08-05
8. Tate conjectures: Conjectures expressed by J. Tate (see ) and describing relations between Diophantine and algebro-geometric properties of an algebraic variety. (Mathematics) [100%] 2023-10-25
9. Moonshine conjectures: In 1978, J. McKay observed that $196884 = 196883 + 1$. (Mathematics) [100%] 2023-11-14
10. Sierpinski conjectures: For the original Sierpinski problem, it is finding and proving the smallest k such that k×b+1 is not prime for all integers n ≥ 1 and GCD(k+1, b-1)=1. Finding and proving the smallest k such ... [100%] 2023-04-10
11. Weil conjectures: In mathematics, the Weil conjectures were highly influential proposals by André Weil (1949). They led to a successful multi-decade program to prove them, in which many leading researchers developed the framework of modern algebraic geometry and number theory. (On generating functions from counting points on algebraic varieties over finite fields) [100%] 2023-11-16 [Topological methods of algebraic geometry] [Theorems in number theory]...
12. Beilinson conjectures: Let $ X $ be a smooth projective variety (cf. Projective scheme) defined over $ \mathbf Q $. (Mathematics) [100%] 2024-03-05
13. List of conjectures: This is a list of notable mathematical conjectures. The following conjectures remain open. (none) [81%] 2024-03-01 [Mathematics-related lists] [Conjectures]...
14. Hardy–Littlewood zeta-function conjectures: In mathematics, the Hardy–Littlewood zeta-function conjectures, named after Godfrey Harold Hardy and John Edensor Littlewood, are two conjectures concerning the distances between zeros and the density of zeros of the Riemann zeta function. In 1914, Godfrey Harold Hardy ... [63%] 2023-10-01 [Conjectures] [Zeta and L-functions]...
15. Homological conjectures in commutative algebra: In mathematics, homological conjectures have been a focus of research activity in commutative algebra since the early 1960s. They concern a number of interrelated (sometimes surprisingly so) conjectures relating various homological properties of a commutative ring to its internal ring ... [63%] 2023-02-14 [Commutative algebra] [Homological algebra]...
16. Hardy–Littlewood zeta-function conjectures: In mathematics, the Hardy–Littlewood zeta-function conjectures, named after Godfrey Harold Hardy and John Edensor Littlewood, are two conjectures concerning the distances between zeros and the density of zeros of the Riemann zeta function. In 1914, Godfrey Harold Hardy ... [63%] 2023-09-15 [Conjectures] [Zeta and L-functions]...
17. Standard conjectures on algebraic cycles: In mathematics, the standard conjectures about algebraic cycles are several conjectures describing the relationship of algebraic cycles and Weil cohomology theories. One of the original applications of these conjectures, envisaged by Alexander Grothendieck, was to prove that his construction of ... [63%] 2025-03-11 [Algebraic geometry] [Conjectures]...
18. Standard conjectures on algebraic cycles: In mathematics, the standard conjectures about algebraic cycles are several conjectures describing the relationship of algebraic cycles and Weil cohomology theories. One of the original applications of these conjectures, envisaged by Alexander Grothendieck, was to prove that his construction of ... [63%] 2025-04-19 [Algebraic geometry] [Conjectures]...