| Author | Message | ||
     Stig Side Hero Username: Stig Post Number: 5919 Registered: 01-2010 Posted From: 117.195.236.197 Rating: N/A |
Chass .... roju diskarej sestunnar ... naa valla kaadu inka Qwit sesta DB ni !! -------- Only seven people have looked The Stig straight in the eyes. They are all dead now !! | ||
| Ishan Side Hero Username: Ishan Post Number: 4920 Registered: 01-2009 Posted From: 128.249.106.194 Rating: N/A |
 http://www.youtube.com/watch?v=v4Weah5XlW8 | ||
| Stig Side Hero Username: Stig Post Number: 5916 Registered: 01-2010 Posted From: 117.195.236.197 Rating: N/A |
Flaws in Amit Deolalikar's P != NP proof http://rjlipton.wordpress.com/2010/08/12/fatal-flaws-in-deol alikars-proof/ -------- Only seven people have looked The Stig straight in the eyes. They are all dead now !! | ||
| Stig Side Hero Username: Stig Post Number: 5915 Registered: 01-2010 Posted From: 117.195.236.197 Rating: N/A |
P vs NP problem Monne oo Indian researcher deeni possible proof ni publish chesaru,this problem was defined by Stephen Cook and it is considered as one of the most important unsolved problems in theoretical computer science. The solution of the problem could have a signifficant impact in mathematics, biology and cryptog raphy. The Hodge conjecture problem The Hodge conjecture is that for projective algebraic varieties, Hodge cycles are rational linear combinations of algebraic cycles. This problem was given by Pierre Deligne. The Poincare conjecture (SOLVED) In topology, a sphere with a two-dimensional surface is essentially characterized by the fact that it is simply connected. It is also true that every 2-dimensional surface which is both compact and simply connected is topologically a sphere. The Poincare conjecture is that this is also true for spheres with three-dimensional surfaces. The question had long been solved for all dimensions above three. Solving it for three is central to the problem of classifying 3-manifolds. This problem was given by John Milnor. A proof of this conjecture was given by Grigori Perelman 7 years ago who allegedly refused to receive million dollars prize because he believed his contribution to solving this problem wasn't greater than Columbia University's mathematician Richard Hamilton. The Riemann hypothesis The Riemann hypothesis is that all nontrivial zeros of the analytical continuation of the Riemann zeta function have a real part of 1/2. Anyone who would proof or disproof this hypothesis would contribute to some far-reaching implications in number theory. Official statement of the problem was given by Enrico Bombieri. Yang-Mills existence and mass gap In physics, classical Yang-Mills theory is a generalization of the Maxwell theory of electromagnetism where the chromo-electromagnetic field itself carries charges. As a classical field theory it has solutions which travel at the speed of light so that its quantum version should describe massless particles (gluons). However, the postulated phenomenon of color confinement permits only bound states of gluons, forming massive particles. This is the mass gap. Another aspect of confinement is asymptotic freedom which makes it conceivable that quantum Yang-Mills theory exists without restriction to low energy scales. The problem is to establish rigorously the existence of the quantum Yang-Mills theory and a mass gap. The official statement of the problem was given by Arthur Jaffe and Edward Witten. Navier-Stokes existence and smoothness The Navier-Stokes equations describe the motion of fluids. Although they were found in the 19th century, they still are not well understood. The problem is to make progress toward a mathematical theory that will give us insight into these equations. The official statement of the problem was given by Charles Fefferman. The Birch and Swinnerton-Dyer conjecture The Birch and Swinnerton-Dyer conjecture deals with a certain type of equation, those defining elliptic curves over the rational numbers. The conjecture is that there is a simple way to tell whether such equations have a finite or infinite number of rational solutions. Hilbert's tenth problem dealt with a more general type of equation, and in that case it was proven that there is no way to decide whether a given equation even has any solutions. The official statement of the problem was given by Andrew Wiles. } Kanipettisntaruvtha ellaki http://www.claymath.org/ inform seyyandi check pampistaru !! -------- Only seven people have looked The Stig straight in the eyes. They are all dead now !! |
