Objectif The twin prime conjecture, that n and n+2 are infinitely often primes simultaneously, is probably the oldest unsolved problem in mathematics. De Polignac (1849) conjectured that for every even value of h, n and n+h are infinitely often primes simultaneously. These are the most basic problems on gaps and patterns in primes. Another one is the conjecture of Waring (1770), stating that there are arbitrarily long arithmetic progressions (AP) of primes. For the newest developments we cite Granville (Bull. AMS 43 (2006), p.93): ): Despite much research of excellent quality, there have been few breakthroughs on the most natural questions about the distribution of prime numbers in the last few decades. That situation has recently changed dramatically with two extraordinary breakthroughs, each on questions that the experts had held out little hope for in the foreseeable future. Green and Tao proved that there are infinitely many k-term arithmetic progressions of primes using methods that are mostly far removed from mainstream analytic number theory. Indeed, their work centers around a brilliant development of recent results in ergodic theory and harmonic analysis. Their proof is finished, in a natural way, by an adaptation of the proof of the other fantastic new result in this area, Goldston, Pintz and Yildirim s proof that there are small gaps between primes. The proposal's aim is to study these types of patterns in primes with possible combination of the two theories. We quote 3 of the main problems, the first one being the most important. 1) Bounded Gap Conjecture. Are there infinitely many bounded gaps between primes? 2) Suppose that primes have a level of distribution larger than 1/2. Does a fixed h exists such that for every k there is a k-term AP of generalised twin prime pairs (p, p+h)? 3) Erdôs' conjecture for k=3. Suppose A is a sequence of natural numbers, such that the sum of their reciprocals is unbounded. Does A contain infinitely many 3-term AP's? Champ scientifique natural sciencesmathematicspure mathematicsarithmeticsprime numbers Mots‑clés Goldbach conjecture distribution of primes gaps between primes patterns in primes primes twin prime conjecture Programme(s) FP7-IDEAS-ERC - Specific programme: "Ideas" implementing the Seventh Framework Programme of the European Community for research, technological development and demonstration activities (2007 to 2013) Thème(s) ERC-AG-PE1 - ERC Advanced Grant - Mathematical foundations Appel à propositions ERC-2008-AdG Voir d’autres projets de cet appel Régime de financement ERC-AG - ERC Advanced Grant Institution d’accueil HUN-REN RENYI ALFRED MATEMATIKAI KUTATOINTEZET Contribution de l’UE € 1 376 400,00 Adresse REALTANODA STREET 13-15 1053 Budapest Hongrie Voir sur la carte Région Közép-Magyarország Budapest Budapest Type d’activité Other Contact administratif Peter Pal Palfy (Prof.) Chercheur principal Janos Pintz (Prof.) Liens Contacter l’organisation Opens in new window Site web Opens in new window Coût total Aucune donnée Bénéficiaires (1) Trier par ordre alphabétique Trier par contribution de l’UE Tout développer Tout réduire HUN-REN RENYI ALFRED MATEMATIKAI KUTATOINTEZET Hongrie Contribution de l’UE € 1 376 400,00 Adresse REALTANODA STREET 13-15 1053 Budapest Voir sur la carte Région Közép-Magyarország Budapest Budapest Type d’activité Other Contact administratif Peter Pal Palfy (Prof.) Chercheur principal Janos Pintz (Prof.) Liens Contacter l’organisation Opens in new window Site web Opens in new window Coût total Aucune donnée