Pages that link to "Item:Q1416231"

The following pages link to VAK, vacuum fluctuation and the mass spectrum of high energy particle physics. (Q1416231):

Displaying 35 items.

• Derivation of Korteweg-de Vries flow equations from nonlinear Schrödinger equation (Q602229) (← links)
• Gauss map and Lyapunov exponents of interacting particles in a billiard (Q712107) (← links)
• A multifractal formalism in a probability space (Q813511) (← links)
• Complex vacuum fluctuation as a chaotic ``limit'' set of any Kleinian group transformation and the mass spectrum of high energy particle physics via spontaneous self-organization. (Q1416205) (← links)
• Derivation of the fine structure constant using fractional dynamics. (Q1416232) (← links)
• The Cantorian interpretation of high energy physics and the mass spectrum of elementary particles. (Q1416261) (← links)
• On a connection between the VAK, knot theory and El Naschie's theory of the mass spectrum of the high energy elementary particles (Q1432929) (← links)
• Elie Cartan and pan-geometry of multispatial hyperspace (Q1432931) (← links)
• A note about Milnor attractor and riddled basin (Q1432968) (← links)
• The mass of the neutrinos via the energy of the cosmic background radiation of the VAK (Q1433726) (← links)
• The VAK of vacuum fluctuation: Spontaneous self-organization and complexity theory interpretation of high energy particle physics and the mass spectrum (Q1433748) (← links)
• A review of \(E\) infinity theory and the mass spectrum of high energy particle physics (Q1433845) (← links)
• Fantappié's group as an extension of special relativity on \({\mathcal E}^{(\infty)}\) Cantorian space-time (Q1766557) (← links)
• Coupling constants in fractal and cantorian physics (Q1766560) (← links)
• On a connection between Stieltjes continued fraction, KAM theory and E-infinity theory (Q1766581) (← links)
• The concepts of \(E\) infinity: an elementary introduction to the Cantorian-fractal theory of quantum physics (Q1766650) (← links)
• Local scale invariance, Cantorian space-time and unified field theory (Q1771658) (← links)
• Structurally stable but chaotic limit set of \(E\)-infinity Cantorian space-time (Q1771709) (← links)
• On the universe's missing mass (Q1772623) (← links)
• Frostman lemmas for Hausdorff measure and packing measure in a product probability space and their physical application (Q1772882) (← links)
• Renormalization group and the emergence of random fractal topology in quantum field theory (Q1877939) (← links)
• El Naschie's Cantorian strings and duality in Weyl--Dirac theory (Q1877943) (← links)
• Folding--retraction of chaotic dynamical manifold and the VAK of vacuum fluctuation (Q1878032) (← links)
• On a possible evidence for Cantorian space-time in cosmic ray astrophysics (Q1878060) (← links)
• Anomalous positron peaks and experimental verification of \(\varepsilon^{(\infty)}\) super symmetric grand unifica\-tion (Q1878064) (← links)
• New elementary particles as a possible product of a disintegrating symplictic vacuum (Q1878124) (← links)
• On a connection between the limit set of the Möbius-Klein transformation, periodic continued fractions, El Naschie's topological theory of high energy particle physics and the possibility of a new axion-like particle (Q1878154) (← links)
• How gravitational instanton could solve the mass problem of the standard model of high energy particle physics (Q1878185) (← links)
• El Naschie's Cantorian strings and dendritic morphogenesis (Q1878217) (← links)
• Cantorian small world, Mach's principle, and the universal mass network (Q1878249) (← links)
• Multifractal dimension inequalities in a probability space (Q2468068) (← links)
• Periodic continued fraction representations of different quark's mass ratios (Q2483570) (← links)
• Complexity in quantum field theory and physics beyond the standard model (Q2497601) (← links)
• The golden mean in the topology of four-manifolds, in conformal field theory, in the mathematical probability theory and in Cantorian space-time (Q2497627) (← links)
• Derivation of Korteweg‐de Vries flow equations from fourth order nonlinear Schrödinger equation (Q5406979) (← links)