How to use in-sentence of “conjecture”:
+ He was known for developing the theory of abelian variety of CM-typecomplex multiplication of abelian varieties and Shimura varieties, as well as the Taniyama–Shimura conjecture which led to the proof of Fermat’s Last Theorem.
+ After a conjecture is proven to be true, it becomes a theorem.
+ Wiles’s proof of Fermat’s Last TheoremWiles’s proof of the longstanding conjecture called Fermat’s last theorem is an example of the power of this approach.
+ The conjecture states that if “n” is positive, “n” will always reach one.
+ By way of string theory and the holographic principle, some physicists conjecture that Plato’s allegory of the cave approximates the natural world’s structure.
+ The Riemann hypothesis is a conjecture about the distribution of the zeros of the Riemann zeta function.
+ Not every conjecture can be proven true or false.
+ The conjecture is named after a man called Bernhard Riemann.
Example sentences of “conjecture”:
+ Goldbach’s weak conjecture was later proved by Harald Helfgott in 2013, but Goldbach’s strong conjecture has not been proved yet.
+ The Poincaré conjecture can also be extended to higher dimensions: this is the generalised Poincaré conjecture.
+ This partial proof of the Sato–Tate conjecture uses a theorem of Wiles.
+ The conjecture asks whether the same is true for the 3-sphere, which is an object living naturally in four dimensions.
+ The Kepler conjecture is a problem in math.
+ This can however be approximated to any given precision even if the conjecture is unprovable.
+ In 1890, Percy John Heawood created what is called Heawood conjecture today: It asks the same question as the four color theorem, but for any topological object.
+ For instance, if Goldbach’s conjecture is true but unprovable, then it is impossible to correctly round down 0.5 + 10 where n is the first even number greater than 4 which is not the sum of two primes, or 0.5 if there is no such number.
+ Other generalizations of the main conjecture proved using the Euler system method have been found by Karl Rubin, amongst others.
+ The Heawood conjecture gives a formula that works for all such objects, except the Klein bottle.
+ Goldbach's weak conjecture was later proved by Harald Helfgott in 2013, but Goldbach's strong conjecture has not been proved yet.
+ The Poincaré conjecture can also be extended to higher dimensions: this is the generalised Poincaré conjecture.
+ This partial proof of the Sato–Tate conjecture uses a theorem of Wiles.
+ The main conjecture of Iwasawa theory was formulated as an assertion that two ways of defining p-adic L-functions should coincide, as far as that was well-defined.
+ Some now conjecture that black holes do not exist as such but are dark energy, Ball P, “Nature News”, 31 Mar 2005 or that our universe is both—a black hole and dark energy.
+ Of these, only the Poincaré conjecture has since been solved.
+ This has led to some conjecture over it: U.S.
+ He was also known for the proof of the Milnor conjecture and motivic Bloch-Kato conjectures and for the univalent foundations of mathematics and homotopy type theory.
+ In 2017, the conjecture was proven by Aaron Brown and Sebastian Hurtado-Salazar of the University of Chicago and David Fisher of Indiana University.
+ Euler, becoming interested in the problem, wrote back to Goldbach saying that the weak conjecture would be implied by Goldbach’s strong conjecture, saying that he was certain that the theorem was true, but he was unable to prove it.