tag:blogger.com,1999:blog-416737812331434120.post4303555656825571483..comments2023-03-30T00:55:03.648-07:00Comments on theory: t, H, W, Z, part 3Unknownnoreply@blogger.comBlogger2125tag:blogger.com,1999:blog-416737812331434120.post-70022844494035178352013-08-06T22:50:42.381-07:002013-08-06T22:50:42.381-07:00(3) is almost exactly true. (1) and (2) are consi...(3) is almost exactly true. (1) and (2) are considerably more distant from the world best estimates of the quantities in question.andrewhttps://www.blogger.com/profile/08172964121659914379noreply@blogger.comtag:blogger.com,1999:blog-416737812331434120.post-88194892656877217752013-06-16T23:56:21.382-07:002013-06-16T23:56:21.382-07:00More good "numerology"
mh/me = 4(2PI)⁶ ...More good "numerology"<br /><br />mh/me = 4(2PI)⁶ = 7² / (Delta)² (7d)= 246115.633555 ===> 125,7 Gev<br /><br /><br />The spins, extra dimensions: value higgs vacuum and higgs boson mass ( not numerology: theoretical proof )<br /><br />"Quantum information and Cosmology: The connections by Angel Garcés Doz"<br /><br />http://fqxi.org/community/forum/topic/essay-download/1619/__details/Doz_essay_2013.pdf<br /><br />"Thus the mass of the Higgs boson is very approximately expressible as a function<br />7² / (Delta)² (7d) . This<br />of the square of the uncertainty in seven dimensions, namely: (Delta)²<br />(7d) = 7²/[4(2PI)⁶]<br /><br />Pag 3 <br />"Strong Holographic Principle. Higgs vacuum value. Higgs boson mass"<br /><br />http://fqxi.org/community/forum/topic/essay-download/1619/__details/Doz_essay_2013.pdf<br /><br />============================================<br /><br />Fibonacci numbers divisors of the number of nonzero roots E8 group: or the amount of hyperspheres in eight dimensions maximally compacted: 240 = 1 x 2 x 3 x 5 x 8<br /><br />(8⁶-5⁶+3⁶-2⁶+1⁶)-(8³-5³-3³-2-1³)= 246834= mh/me ======> mh = 126.13 Gev<br /><br />mh= m(Higgs Vaccum = 246.221202 Gev) x P(2,r7 ) ====> mh= 126.177 Gev<br /><br />P(2,r7 )= probability particle in a box, string one dimension<br /><br />r7 = ratio lenght planck seven dimensions/ planck lenght( compactification kalulza-klein) <br /><br />(r7)⁸ = ( 4(2PI)⁶)/[8 x ( 16(PI)³/15 )] ; 16(PI)³/15 is the factor surface of a sphere, or torus, in seven dimensions.<br /><br />P(2,r7) =sin²(2PI/r7)(2/r7)<br /><br />http://fqxi.org/community/forum/topic/essay-download/1619/__details/Doz_essay_2013.pd<br /><br />Regardas ( A. Garcés Doz )mr nothinghttps://www.blogger.com/profile/05182750705725644070noreply@blogger.com