Abstract

We consider a hybrid scalar field which is nonminimally coupled to the matter and models a chameleon cosmology. By introducing an effective potential, we study the dependence of the effective potential's minimum and hybrid chameleon field's masses on the local matter density. In a dynamical system technique, we analyze the phase space of this two-field chameleon model, find its fixed points and study their stability. We show that the hybrid chameleon domination solution is a stable attractor and the universe in this setup experiences a phantom divide crossing.

1. Introduction

Recent cosmological observations have revealed that our universe is currently undergoing an accelerating phase of expansion [114]. This transition to the accelerating phase has occurred in the recent cosmological past. Several approaches have been proposed to explain this late-time acceleration of the universe. Introducing some sort of unknown energy component (dubbed “dark energy”), with negative pressure, is one of these various approaches [1537]. The simplest candidate for dark energy is the cosmological constant. However, the cosmological constant suffers from serious problems such as huge amount of fine tuning required for its magnitude and other theoretical problems such as unknown origin and lake of dynamics [3841]. Nevertheless, the standard cosmological model with a cosmological constant has no internal problems or inconsistencies both at the classical and quantum levels [42].

In this regard, the scalar fields, such as quintessence [43, 44], phantom fields [45], and tachyon fields [46, 47] and so on, provide a simple dynamical model for dark energy which can explain cosmic accelerating expansion. The scalar fields can directly couple to matter Lagrangian or indirectly couple to the Ricci scalar [4851]. If there are negligible self-interactions for scalar fields, then the experimental bounds on such fields require them either to couple to the matter much more weakly than the gravity does, or to couple very strongly [5255]. Such fields must be very light (their mass must be of the order of , the present Hubble parameter) in order to evolve cosmologically today. Also, in order to have consistency with Equivalence Principal, their coupling to the matter must be extremely small. Chameleon cosmology [56, 57] is a scenario which can address this problem suitably. In the chameleon cosmology, the scalar fields evolve on the cosmological time scales today, while according to the expectations from string theory they have couplings of order unity to the matter and at the same time remain very light on the cosmological scales. In fact, the mass of the scalar field is not constant and, instead, it depends on the local matter density. In the high density regime, the mass of the scalar fields is large, so that the resulting violations of the Equivalence Principal are exponentially suppressed. On the cosmological scales, where the density is very low, the mass of the fields can be of the order of the present Hubble parameter () and cause the current acceleration of the universe. Such a scalar field is dubbed “chameleon” because its physical properties, such as its mass, depend on its environment [56, 57]. We note that this definition of the “chameleon” field is too wide and includes situations such as plasma density dependence of plasmon mass and also density and temperature dependence of elementary particles masses through their effective potentials. In our setup the term chameleon has sense only in the case of specific exponential coupling of known quantum fields of matter to the chameleon field [53].

The present work has been organized as follows: In Section 2, we introduce the idea of chameleon cosmology. We consider a quintom scalar field which is nonminimally coupled to the matter (a quintom field is a hybrid of a quintessence and a phantom field [5863]). In this section, by means of the conservation equation, we derive the matter energy density which depends on the hybrid scalar field. We study the effective chameleon potential, its minimum, and the mass of two fields about the minimum of the potential. We show that the value of the scalar fields and their masses at the minimum depend on local energy density. In Section 3, we study the cosmological dynamics of the model in the dynamical system approach and we provide a detailed phase space analysis of the model. We find that in the parameters space of the model it is possible to have a chameleon dominated stable attractor which has a negative effective equation of state. We also show that, in this setup, the effective equation of state parameter of the model crosses the phantom divide line and the deceleration parameter becomes negative in the past. So this model has the capability to explain the late-time cosmic speedup.

2. The Setup

The action of a two-field chameleon model in 4 dimensions can be written as follows: where is the gravitational coupling and represents the Lagrangian density of the matter fields. Also, the matter fields are coupled to the scalar fields by the definition , where are dimensionless constants. In this paper, we assume just a single matter energy density component () with coupling . Also, according to the expectations from string theory, we allow to be of the order of unity.

In a flat Friedmann-Robertson-Walker background, variation of action (1) with respect to the metric leads to the following equations: To derive these equations we have assumed that the matter field of the universe is a perfect fluid, so that . Variation of the action (1) with respect to the scalar fields gives the following equation of motion:

Equations (2)–(4) give us the energy conservation equation of the model as follows: The right hand side of (5) shows the nonconservation of the energy density in this setup, which is due to the presence of nonminimal coupling between the hybrid scalar field and matter Lagrangian (in other words, it is due to the presence of the chameleon field). In the absence of chameleon field (the case that goes to zero), (5) simplifies to the ordinary conservation equation.

If we integrate (5), we reach the following expression for the matter energy density: where is a constant. This equation shows that the scalar fields and the matter energy density are related to each other via the chameleon coupling term.

By using (2) and (3), we can deduce the effective equation of state parameter in our setup as follows:

Equation (4) shows that the dynamics of hybrid scalar field in this case do not just depend only on the , but instead it depends on an effective potential which is defined as follows: which is usually dubbed chameleon effective potential. This effective potential depends explicitly on the matter density . We note that we assume a runaway potential defined as which decreases by increment of the scalar fields. Also, the coupling term () increases as the scalar fields increase (see Figure 1).

So, if , has minimum. The behavior of the effective potential with respect to and is shown in Figure 2.

We denote the values of and , where the effective potential becomes minimum (the derivative of the effective potential becomes zero), by and respectively. Then, the minimum of the effective potential in our model occurs atThe above expression shows that the minimum of the effective chameleon potential is a line. Since we deal with positive scalar field, leads us to a constraint on as follows: This means that if satisfies the constraint equation (11), there is a minimum for effective potential as is shown in Figure 2.

The mass of the scalar field about the minimum is obtained from the following relation: So, we find Also the mass of the scalar field is given by leading to the result As (13) and (15) show, and , are increasing functions of local matter density, . This means that the larger values of matter density lead to larger values of the chameleon field’s mass.

3. Cosmological Dynamics

In this section, we are going to study cosmological dynamics of the hybrid chameleon model introduced in the previous section in the framework of dynamical system analysis and phase space trajectories of the model. In this regard, we should firstly introduce some new convenient dimensionless variables. These dimensionless quantities help us to translate our equations of the cosmological dynamics in the language of the autonomous dynamical system. In our setup, the dimensionless parameters are defined as follows: By rewriting the Friedmann equation (2) in terms of the new variables, we reach a constraint on the parameters space of the model as follows: by which we can express one of the dimensionless variables in terms of the others.

By introducing a new time variable , we obtain the following autonomous system in our setup:

Now, in order to analyze the cosmological evolution in the dynamical system approach, we should find fixed (or critical) points of the model. Fixed points are defined as those points that all autonomous equations (18) vanish. Eliminating by using constraint equation (17), we obtain the critical points of our setup. We find four critical points (M, N, P, and Q) and two critical lines ( and ) in our setup which we have summarized their properties in Tables 1, 2, and 3.

Now we discuss characters of each critical point separately.

Critical Point M. Point M represents either a solution with a scalar field’s kinetic energy term domination or potential energy term domination, depending on the values of and . Also, depending on these values, this solution can be stable or unstable. For instance, by taking and , the universe with this solution is an attractor, potential energy term dominated, meaning that if the universe reaches this state, it remains there forever. The value of effective equation of state parameter corresponding to this solution is negative (−0.78), so this case is corresponding to an accelerating universe. Figure 3 shows the phase space trajectories of the model in two dimensions for , , , and (corresponding to potential energy domination). The point M is shown as an attractor point in this plot. Also, we can see this stable point in 3-dimensional plot as shown in Figure 4. If we set and , the solution is a saddle, kinetic energy domination. The universe during its evolution can reach this state but does not remain there and evolves to another state. In this case, the corresponding value of the effective equation of state parameter is positive () and shows a decelerating universe. This saddle point of the phase space trajectories is shown in Figure 5. This figure is plotted for and . The point M would be corresponding to a repeller, kinetic term dominated solution if for instance we set , , and (see Figure 6). This unstable solution is relevant to early times cosmology.

Critical Point N. Critical point N exists if (in other words, if there is no stiff fluid in the universe). For this solution, the effective equation of state parameter is exactly the same as the equation of state parameter of the matter and so the universe with this solution is effectively matter dominated. For , depending on the values of and , this matter dominated solution can be stable or saddle point. Also, with , this solution is always a saddle, independent of the values of and . This means that the universe, during its evolution, experiences this matter domination state and then evolves to another state. The point N, in both Figures 4 and 5, is a saddle point in the phase space of the model. It should be noticed that since both figures have been plotted with , for both and , N is a saddle point.

Critical Point P. Like the critical point N, the critical point P exists if . The properties of this critical point are the same as the properties of the critical point N. In Figure 4, we can see the point P as a saddle point in the phase space trajectories of the model. This point is not shown in Figure 3, because this figure has been plotted for positive while P is located at .

Critical Point Q. The critical point Q exists if there is the following constraint on the parameters space of the model: If this critical point exists, its location is at whereAlso, are the eigenvalues of the following matrix where prime refers to derivative with respect to (see (18)). We note that since the eigenvalues of this solution are so lengthy and complicated, we avoid to express them here explicitly. The universe with this solution experiences an accelerating phase if Point Q of Figure 5 is a stable chameleon dominated solution and this means that, if the universe reaches this state, it remains there forever. In this solution, the universe can experience the late time acceleration. Figure 5 shows 3-dimensional phase space of our setup with , , , and . With these values of the parameters, the critical points M and N are saddle points and the point Q is a stable attractor. In summary, we can say that, with these parameters values, the universe during its evolution reaches a kinetic energy dominated era and then evolves to a matter dominated era. After that the universe evolves to a chameleon dominated era and remains there forever. Also, with this choice of values, the value of the effective equation of state parameter is about . This means that the universe in this parameters space experiences late time acceleration and its stable state lies in phantom-like phase.

Critical Line . In this model, we also have two critical lines. The critical line , which is located at , is a quintessence’s kinetic term dominated solution. So, there is a constraint on this solution. This kinetic energy dominated solution exists if The stability of this line depends on the model parameters values. In the parameters space which satisfies the following constraint, this solution is a stable attractor: In Figure 3 where the chosen values of the parameters do not satisfy the constraint equation (25), the critical line is unstable. But in Figure 6 this line is a stable attractor because the values of parameters used to plot this figure satisfy the mentioned constraint.

Critical Line . This phantom’s kinetic energy dominated critical line is located at . So, for existence of this solution, the constraint equation (25) should be satisfied. In contrast to case, the critical line is an unstable solution for all values of the model parameters space (see Figures 3 and 6).

A parameter which gives us a suitable background to understand the dynamics of the universe, the nature of dark energy, and the possibility of crossing of the phantom-divide line is the equation of state parameter. According to the recent observational data, the equation of state parameter of the dark energy crossed the phantom divide line () in the near past. It is shown that considering a dynamical dark energy component in a cosmological setup enables the model to explain this observational evidence [1537]. Figure 7 shows the evolution of with respect to the redshift parameter in our setup. This figure has been plotted by adopting the ansatz with , , and (, , and are positive constants). Note that, in this figure, the values of parameters are the same as Figure 5 (where the chameleon dominated solution is a stable attractor). Also, we have set , , , and . As figure shows, in the presence of the chameleon field, the universe enters the phantom phase in the near past at . So, in this model, the universe experiences a smooth crossing of the phantom divide, , line.

The deceleration parameter, , is another important parameter in cosmological evolution. Its positive value (corresponding to ) shows the decelerating expansion of the universe and its negative value (corresponding to ) shows the accelerating expansion. is defined as follows: The evolution of the deceleration parameter versus redshift is plotted in Figure 8. We can see from this figure that the deceleration parameter has become negative in the past at , meaning that the universe has entered an accelerating phase at . So a hybrid chameleon model has the phantom-like behavior and can explain the late time cosmic acceleration of the universe in an observationally viable manner.

4. Summary

In the current paper, we have studied a hybrid chameleon model in detail. By choosing a runaway potential and by using the coupling term , we have introduced an effective chameleon potential. In contrast with runaway potential and coupling term, this effective chameleon potential has a minimum. We have derived this minimum and the masses of the hybrid chameleon field in the minimum. We have found that the minimum of the effective chameleon potential is a line and in order for this minimum to exist, there is a constraint on the parameters space of the model. It has been shown that the chameleon field and the matter energy density are related to each other. Also, we have shown that the larger values of the density lead to larger values of the chameleon field’s masses. Then we have considered the cosmological dynamics of the hybrid chameleon model. In a dynamical system approach, we have studied the phase space trajectories of the model and its stability. We have found four critical points and two critical lines in our setup and have derived their eigenvalues in order to find the stable solutions. The critical lines and points can be attractor, repeller, and saddle, depending on the values of the parameter spaces. By analyzing two- and three-dimensional phase spaces, it was shown that there are matter domination, scalar field’s kinetic term domination, and chameleon domination stable solutions, depending on the values of the parameters space. With some values of the parameters space, we have found the solution where the universe after passing the scalar field’s kinetic term dominated era (repeller) and the potential energy dominated and matter dominated era (saddle) reaches a stable attractor chameleon dominated era and remains there forever (one can see the saddle point and attractor in Figure 5). Also, the effective equation of state parameter in this case is below . By adopting the parameter’s values used in Figure 5, we have analyzed the late time dynamics of the hybrid chameleon model. We have shown that the universe in this setup has crossed the phantom divide line at and has entered the accelerating phase at . So a hybrid chameleon model can explain the late time cosmic acceleration and realize the phantom behavior.

Acknowledgments

This work has been supported financially by Research Institute for Astronomy and Astrophysics of Maragha (RIAAM) under research project no. 1/2782-34.