The suggestion is that the various dynamical and lensing effects that are tentatively interpreted in the standard approach as necessitating the existence of large amounts of unseen matter can be readily explained by the fractality of space.
Recall that, starting from the three simplest new properties of a non-differentible manifold (as compared with a Riemannian manifold) namely: (i) infinity of geodesics; (ii) decomposition of each elementary displacement in terms of the sum of a classical variable and a fractal variable of fractal dimension 2; (iii) two-valuedness of the velocity vector due to irreversibility in the reflexion dt ↔ -dt, the geodesics equation in a curved and fractal space(-time) can be integrated in the form of a Schrödinger equation [1, 2] that writes at the Newtonian limit:
where φ is the Newtonian potential, which is a solution of the Poisson equation:
From the description of the motion in terms of an infinite family of geodesics, the meaning of P = ψψ† is imposed as giving the probability density of the particle positions, in agreement with Born's postulate. Indeed, separating the real and imaginary parts of the Schrödinger equation and writing it in terms of P and the classical velocity V , we get respectively a generalized Euler-Newton equation and a continuity equation [4]:
This system of equations is equivalent to the classical one used in the standard approach of gravitational structure formation, except for the appearance of an extra potential term q that writes:
This potential is a manifestation of the fractality of space, in the same way as the Newtonian potential is a manifestation of space-time curvature. We suggest that its existence explains the various dynamical effects presently attributed to unseen, dark matter. Indeed, let us come back to the Schrödinger form of these equations. Two extreme situations (and any intermediate between them) can be considered:
(i) The particles fill the probability density distribution, so that ρ is proportional to P. In this case the system of equations is a coupled Schrödinger-Poisson (Hartree) system, of the kind used to describe superconductivity (by this way our conclusions meet those of Agop et al.[5], who attempt to describe the effect of a Cantorian-fractal space-time in terms of superconducting properties of matter). This case corresponds to a self-gravitating body such as a cluster of galaxies. Now Markowich et al. [6] have demonstrated the general existence and non-linear stability of steady states of the Schrödinger-Poisson system, with conserved total energy.
(ii) There are only very few test-particles, so that from the view-point of matter density, we deal with the vacuum. This case corresponds to the outer regions of spiral galaxies (in the absence of dark matter as assumed here). Therefore φ is a solution of Δφ=0, i.e. φ=-G Σi(Mi/ri). The Schrödinger equation with such a potential has also general stationary solutions. Therefore in both cases, we can write a time-independent Schrödinger equation that takes the simplified form:
where ε=E/m and φ is the steady-state solution for the potential. In the gravitational macroscopic case considered here, this equation is subjected to the principle of equivalence (contrarily to the standard microscopic quantum mechanics, where D=h;/2m, and therefore it does not depend on the inertial mass m of the bodies the distribution of which it describes. Note that in [3] the equations are written in terms of the potential energy Q = mq: our use here of the potential instead of the potential energy allows to manifest the vanishing of the inertial mass from these equations. For this steady-state solution, one finds the relation:
ε = ψ+q.
Since ε=E/m is proportional to v2, this relation expresses the main results of the scale-relativity-Schrödinger approach to gravitational structuration: namely, (i) the expected (and now observationally supported [3]) universal quantization of velocities, i.e. the theoretical prediction that in various gravitational systems the probability distribution of the velocities will not be in general flat, but instead will have a tendency to show structures at values independent of the particular system [1] Chap. 7.2; (ii) the observed values of the velocity (e.g., rotation curves of galaxies, velocity dispersion in clusters of galaxies, ...) is determined, not only by Newton's potential, but also by the new potential q.The proposal is, therefore, that this potential, of non-Poissonian behavior and determined only by usual matter, is at the origin of the various dynamical and lensing effects usually attributed to unseen additional mass. For example, in the Kepler problem (that applies in the outskirts of spiral galaxies), the additional potential writes q = ε+GM/r = -(GM/r0)(1-r0/r), and we directly recover the result obtained in [3] for the fundamental level, but now whatever the state.
Another proposal concerns the new fundamental gravitational coupling constant αg [4]. Contrarily to what happens in the classical theory, the Schrödinger-like equation of motion can be shown to be gauge invariant. If the potential Φ = mφ is replaced by Φ = GMm∂χ(t)/c∂t, where the factor GMm ensures a correct dimensionality, then the Schrödinger-like equation of motion remains invariant provided ψ is replaced by ψe-iαgχ, with αg related to D by α * 2D = GM/c, which establishes the relation between D and αg = w0/c [3].
Finally, in similarity with the electromagnetic case, we can interpret the arbitrary gauge function χ, up to some numerical constant, as the logarithm of a scale factor lnρ in resolution space. In the special scale-relativity framework, such a scale factor is limited by the ratio of the maximal cosmic scale over the Planck scale. This limitation of χ in the phase of the wave function ψ implies a quantization of its conjugate quantity αg, following the relation (for three independent scale transformations on the three space resolutions):
where k is integer and the numerical constant μ remains to be determined. It may once again involve powers of π factors. It is remarkable in this respect that the relation:
yields a value αg-1 = 2070.10 ±0.15, i.e. w0 = 144.82 ±0.01 km/s, which is in good agreement with it present observational determinations w0 = 144.7 ±0.5 km/s. Reversely, from such a relation, if it was confirmed, a precise measurement of w0 would provide one with a new way of determining the cosmological constant [4].___________________________________
Quoted from:
Nottale L., 2003, Chaos Solitons and Fractals, 16, 539
"Scale-relativistic cosmology"
References:
[1] Nottale L. Fractal Space-Time and Microphysics: Toward a Theory of Scale Relativity. London: World Scientific; 1993.
[2] Nottale L. Astron. Astrophys. 1997;327:867.
[3] Da Rocha D., Nottale L. Chaos, Solitons and Fractals 2002;
[4] Nottale L., Schumacher G., Lefèvre E.T. Astron. Astrophys. 2000; 361: 379.
[5] Agop M., Ioannou P.D., Buzea C. Chaos, Solitons and Fractals 2002; 13: 1137.
[6] Markowich P.A., Rein G., Wolansky G. 2001, arXiv:math-ph/0101020.
(1)
. This is another manifestation of the mysterious character of quantum rules that, to a real momentum, there corresponds a complex operator acting on the complex probability amplitude.
where the Hamiltonian H is a linear Hermitian operator.
