Abstract

It has been revealed, in the context of quantum gravity candidates, that measurement of position cannot be done with arbitrary precision and there is a finite resolution of space-time points. This leads naturally to a minimal measurable length of the order of Planck length. Also, in the context of newly proposed doubly special relativity theories, a test particle’s momentum cannot be arbitrarily imprecise leading nontrivially to a maximal momentum for a test particle. These two natural cutoffs affects most of quantum field theoretic arguments in the spirit of condensed matter physics. Here we focus on the role of these natural cutoffs on Thomas-Fermi theory in condensed matter physics. We show how quantum gravity effects can play important role phenomenologically in many-body interactions of solids.

1. Introduction

According to equivalence principal in general relativity, gravitational field is coupled to everything. It has been characterized that gravity in very small length scales causes serious change in the structure of space-time. It causes minimal uncertainty in positions of atomic and subatomic particles [1–15]. In fact, there is an absolutely small uncertainty in position measurement of any quantum mechanical system and this feature leads nontrivially to the existence of a minimal measurable length on the order of Planck length. Existence of this natural cutoff requires deformation of the standard Heisenberg uncertainty principle to the so-called generalized uncertainty principle (GUP) (see, for instance, [13, 14, 16–21]). In one dimension for positions and momentum operators, the deformed Heisenberg algebra can be represented as In general, for two symmetric operators and , we have So the generalized uncertainty principle can be deduced as While in ordinary quantum mechanics can be made arbitrarily small by letting grow correspondingly, this is no longer the case if (3) holds. If, for decreasing , increases, the new term on the right hand side of (3) will eventually grow faster than the left hand side. Hence can no longer be made arbitrarily small [16–20]. To obtain this minimal uncertainty, we saturate inequality in (3) and solve the resulting equation for : The reality of solutions requires positivity of the term in square root, leading to This smallest uncertainty in position measurement leads nontrivially to the existence of a minimal measurable length. On the other hand, in the context of the doubly special relativity (DSR) theories (for review see [22–27]), one can show that a test particle's momentum cannot be arbitrarily imprecise. In fact there is an upper bound for momentum fluctuations [28–31]. As a nontrivial assumption, this may lead to a maximal measurable momentum for a test particle (see [20, 32–34]). In this framework, the GUP that predicts both a minimal observable length and a maximal momentum can be written (with ) as follows [32, 33]: Since , by setting for simplicity, we find This GUP contains both a minimal length and a maximal momentum. To see how a maximal momentum arises in this setup (see [20], for details), we note that with GUP (7) the absolute minimal measurable length is given by . Due to duality of position and momentum operators, it is reasonable to assume . By saturating the inequality in relation (7), we find This results in So we obtain Now by using the value of , we find The solution of this equation is So, there is an upper bound on particle's momentum uncertainty. As a nontrivial assumption, we assume that this maximal uncertainty in particle's momentum is indeed the maximal measurable momentum. This is of the order of Planck momentum.

The presence of these strong natural constraints in measurement of position and momentum of particles has been ignored in studies of many-body interactions of condensed matter physics. Based on these preliminaries as our main motivation, we are going to study Thomas-Fermi theory in the presence of these natural cutoffs.

Thomas-Fermi theory is a basic theory in many-body interactions. For a system that consists of particles each with mass , the deformed algebra (1) is as follows: where . If the particles of system are interacting via the pairwise potential , the Hamiltonian of our -body system is given by [24] Generally, Hamiltonian of a many-body system with variety of interactions between particles is too difficult to handle. Nevertheless, some progress can be made if we neglect mutual interactions of particles. In this first step analysis the total Hamiltonian of the many-body system transforms to a set of independent single-particle Hamiltonians and these are usually easy to solve. A solid consists of array of atoms in close proximity. This array may be periodic, as in a crystal lattice, but this is not essential. Each atom consists of a positive nucleus surrounded by neutralizing set of electrons and preforms a many-body system. The Hamiltonian of a solid can be written as follows [35]: where the nuclear positions are given by and the electron positions are given by ; is nuclear charge and are the masses of the nucleus and electron, respectively. The primes on the summations mean that we must exclude the terms to prevent self-interactions. Within the Born-Oppenheimer approximation, we have (see [35], for details) The second term of this relation shows the interaction between electrons that is the only obstacle to use single-particle wave function. Within Hartree's approximation we replace the interaction term by an approximate form Now we focus on correlation effects and the Thomas-Fermi model in a solid in equilibrium. Consider a system that includes electronic gas in equilibrium. In this system the local electron density is determined by the Fermi level which is a property of the solid as a whole. Suppose we apply a local electrostatic force that disturbs the system. In this situation, there is a tendency for electrons to migrate until the density is again consistent with the Fermi level. Suppose that is the potential of the applied electrostatic force and is the electrostatic potential due to movement of charges. Then the total potential of the system can be obtained from the following relation: The electrostatic potential satisfies Poisson's equation with the change in the charge density : where   is given by and is the density of states at the Fermi energy. Thus we have where Now (22) can be rewritten as The corresponding homogeneous Thomas-Fermi equation is By using this equation we calculate the total potential and then we are able to obtain a relation for interaction potential. In what follows we are going to investigate Thomas-Fermi model firstly in the presence of a minimal measurable length encoded in a generalized uncertainty principle. We obtain total potential, interaction potential, and the correlation energy that is the rate of required energy for putting electron in the correlation hole and at the end we will find a relation for generalized dielectric function. In each step we compare our results with the standard case to see the effects of quantum gravity corrections. We note that the GUP as a manifestation of quantum gravity effects reflects the universality of quantum gravity corrections [36]. So, all quantum mechanical systems are affected by the quantum gravity effects and Thomas-Fermi model for many-body quantum interactions is not an exception in this regard. On the other hand, quantum gravity effects may have considerable effects on many-body quantum systems and one cannot neglect these effects in principle. It is important to note also that incorporation of the GUP effects in many-body problems may open new window to test quantum gravity in the lab.

2. Thomas-Fermi Equation in the Presence of Minimal Length

In one-dimensional case the deformed Heisenberg algebra reads One of the possible representations of this algebra can be written as where and are the conventional position and momentum operators. Note that while the existence of the natural cutoffs such as the minimal length is a common feature of all quantum gravity candidates, the form of the GUP containing this minimal length is model-dependent. In principle, these representations are not unique. For instance, we have supposed in these representations and we have taken into account only terms of the first order in in a perturbative expansion. Since , so the deformed gradient operator will be as follows: Up to the first order in we have Now in deformed space (25) is replaced with where is the total potential in deformed space. Therefore we find the following differential equation to first order in : We suppose the system is spherically symmetric so that there is no angular dependence and therefore Now (31) takes the following form: This differential equation has the following solutions: For a given with , the terms with coefficients and are not bounded in the limit of . So, to have correct limiting case we set . On the other hand, only the first term gives the physically appropriate limiting result (note also that the term containing has no suitable limit; that is, in the limit of , it cannot recover the standard result in the absence of GUP). So we consider just this term and we set , where is the electron charge. We define So, we find This relation gives the effective interaction potential between electrons in Thomas-Fermi model in the presence of minimal measurable length. It is obvious that, in the limit of , should be transformed into the . In fact, the limit of can be calculated easily. The square root can be expanded as

The limit of this expression for gives as required. It could then be introduced, instead of the normal interaction potential equation (17), into the Schrödinger equation This induced potential causes the correlation energy which an electron needs in order to be located at the correlation hole. In solid state physics, to find this energy we use the following relation [35]: where Using (36) we have Therefore, we find Note that the effect of GUP is hidden in the definition of . This energy appears as an additive constant to the energy of each electron.

3. The Generalized Dielectric Function in Deformed Space

In Thomas-Fermi model, the total potential is obtained from a known external potential . In classical electrostatics, we can introduce a dielectric constant that expresses the relationship between these two potentials: It would be correct also to describe this potential in terms of a dielectric function : Now we come back to (24) and write it in deformed space as where So we find Taking Fourier transform and using a wave vector-dependent dielectric function we can write By substituting these relations in (48) we find So, we find Therefore, From relation , the generalized dielectric function in deformed space is obtained as To first order in and with , we can conclude that in deformed space is defined as Therefore, It is important to note that corrections to the dielectric function in deformed space are wave number dependent. By the Fourier transform of , we can calculate the total potential to find Since the Fourier transform of this potential is thus we find By substituting in this relation we find To first order in this equation can be written as From (55) and (61) we can obtain the total potential as follows: thus, Figure 1 shows the real part and also the norm of for different values of . We note that, since GUP comes from quantum gravity effects via a perturbational scheme, it is natural to think that the GUP parameter is a very small parameter. The case with is the standard case and any deviation from this value incorporates the quantum gravitational effects. We have chosen the mentioned values of in figure just as examples and there is no reason to prevent selection of other nonvanishing values for .

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Figure 1 

Real part (a) and norm (b) of versus for different values of .

The correlation energy can be expressed in the form of where The Fourier transform of the is as follows: Thus, This integral can be calculated numerically to obtain . Figure 2 shows the real part and also the norm of for different values of .

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Figure 2 

Real part (a) and norm (b) of for different values of .

4. Thomas-Fermi Model in the Presence of Minimal Length and Maximal Momentum

Magueijo and Smolin have shown that in the context of the doubly special relativity a test particle's momentum cannot be arbitrarily imprecise and therefore there is an upper bound for momentum fluctuation [28–30] (see also [31]). Then it has been shown that this may lead nontrivially to a maximal measurable momentum for a test particle [32, 33]. In this framework, the GUP that predicts both a minimal observable length and a maximal momentum for a test particle can be written as follows [20, 32–34]: or since , In this framework the following algebraic structure can be deduced (see [32, 33]): where is the GUP parameter in the presence of both a minimal length and a maximal momentum. Similar to the minimal length case, we can define [20, 34] where, as before, and satisfy the canonical commutation relations via the Jacobi identity and and satisfy the generalized commutation relations in the presence of minimal length and maximal momentum [20, 32, 33]: In this section we want to calculate the effects of both minimal length and maximal momentum on the total potential and generalized dielectric function in Thomas-Fermi model. In this case the deformed momentum is defined as So the gradient operator will change as follows: To first order in , can be written as Now, the Thomas-Fermi equation in this case transforms to the following equation: To solve this equation we assume to be a complex quantity so that where . Then the total potential will be a complex function as In spherical coordinate and using (32), we find therefore, The real part of this complex differential equation can be solved to obtain where by definition Only the first term of the solution (82) satisfies the required boundary conditions and gives correct limiting results We suppose to find