Abstract

We use the scalar field constructed in phase space to analyze the analogous Stefan-Boltzmann law and Casimir effect, both of them at finite temperature. The temperature is introduced by Thermo Field Dynamics (TFD) formalism and the quantities are analyzed once projected in the space of coordinates. We show that using the framework of phase space it is possible to introduce a thermal energy which is related to temperature as it vanishes when the temperature tends to zero. In fact given such a correlation the formalism of TFD is equivalent when project is in momenta space when compared to coordinates space.

1. Introduction

Eugene Paul Wigner [1, 2] introduced in 1932 the first formalism to quantum mechanics in phase space, motivated by finding a way to treat transport equations for superfluids. Wigner formalism allows mapping between quantum operators, say A, defined in the Hilbert space, , with classical functions, say , in phase space , through the being the star-product or Moyal-product. The opposite problem, i.e., from a classical function finding the corresponding operator, is accomplished by Weyl mapping. The main motivation to define a given physical theory in phase space is its natural interpretation as demonstrated by classical mechanics. It is not a simple task; for instance, the uncertainty principle is problematic to be formulated. In addition in Wigner’s approach there is no true probability distribution. On the other hand a general framework such as the phase space allows one to analyze a certain system under a different perspective.

The star-product has been explored in phase space in different ways. Particularly, it has been used to define operators like of interest to study irreducible unitary representations of kinematical groups in phase space [3]. In case of nonrelativistic symmetries, this leads to a Schrödinger equation in phase space, where the wave function is directly associated with Wigner function, so with full physical meaning. In this formalism of quantum mechanics, the observables are represented by operators of type , which are used to construct a representation of Galilei symmetries. The Wigner function is given by where are the wave functions, solutions of Schrödinger equation represented in phase space. Since it is a theory of representation, this formalism has been generalized to the relativistic case, leading to the Klein-Gordon and Dirac equations in phase space [4]. This method has been applied successfully, for instance, to the analysis of abelian gauge symmetries [5], describing the dynamics (interaction) in the formulation of quantum theory in phase space.

Although the quantum field theory has successfully been applied to several systems, it does not take into account the temperature of such systems. This is a fundamental problem since all macroscopic features of a quantum model are related to temperature. Among all schemes to introduce temperature in a physical theory we cite two ways. The first one is to interpret time as temperature by a Wick rotation [6]. This approach is problematic when one is dealing with a time-evolution of a physical state. The second one the so-called Thermo Field Dynamics (TFD) formalism; it is a natural way to deal with dynamical systems. It preserves the time-evolution once the temperature is identified with a rotation in a duplicated Fock space [7]. In this article we explore how to implement TFD in phase space; particularly we analyze the scalar field in phase space at finite temperature. The Casimir effect for scalar field in phase space at zero and finite temperature is calculated.

The Casimir effect [8] is measured when two parallel conducting plates are attracted due to vacuum fluctuations. Although the first application has been developed for the electromagnetic field all quantum fields should exhibit this phenomenon. In fact, it was demonstrated that in nonrelativistic fields such as in Schrödinger equation the Casimir effect is present [9]. Particularly for nonrelativistic fields such an effect is physical only at finite temperature. Sparnaay [10] made the first experimental observation of the Casimir effect. Subsequent experiments have established this effect to a high degree of accuracy [11, 12].

The article is divided as follows. In Section 2, the symplectic Klein-Gordon field is introduced. In Section 3, we show the canonical quantization of the scalar field. Then, in Section 4, we recall the ideas of Thermo Field Dynamics formalism. In Section 5, we calculate the energy-momentum tensor of the symplectic scalar field and in Section 6 we derive the Stefan-Boltzmann-like law and the Casimir effect at finite temperature. Finally, in the last section we present our conclusions.

2. Symplectic Klein-Gordon Field and Wigner Function

Let us define the star-operator as

and hence we can derive the following operators:and

These operators satisfy Poincaré algebra and act in Hilbert space associated with phase space . From them, we construct a symplectic representation of Poincaré-Lie algebra and, as a result, we obtain the Klein-Gordon equation in phase space [4]:The functions are defined in phase space and satisfy the condition Equation (6) can be derived from Lagrangian given by [5]:where . The association with Wigner formalism is obtained fromTo show this, we multiply the right-hand side of (5) by ,but since , we also haveSubtracting (10) from (11), and using the associativity of star-product, we getwhere the Moyal-bracket is given by Calculating, we obtaina well-known result. Other properties of Wigner function, such as nonpositiveness, can be derived analogous to a nonrelativistic case [3].

If we consider the interaction potential , the following density of Lagrangian should be used:

This Lagrangian induces the equationwhere .

Solutions for (16) can be obtained from the Green function method. For this proposal, take the function in which the following is satisfied:where is the Green function. By superposition principle, solution of (17) is given bywhere is the solution of free case.

We can find the solution of (18) taking its Fourier transform. Defining , , and , the following follows:where stands the Fourier transform of function . In this way, we obtainThen,The solution is

Wigner function can be derived from Green function by [13]

Equation (23) provides a method to describe the interaction process and scattering theory with physical interpretation in phase space.

3. Canonical Quantization of Scalar Field in Phase Space

In this section we construct the formalism of canonical quantization of Klein-Gordon field in phase space. From this formalism we obtain the propagator written in phase space.

From Lagrangian given in (15) we define the conjugate momenta associated with fields and by and

After some calculations, we have and

Following usual procedure of quantization, we impose the commutation relationsandand the other commutation relations are nulls.

3.1. Annihilation and Creation Operators

The fields and may be expanded asandwhere and the canonical variable related to the position is ; i.e., .

The functions form an orthonormal setwhere .

In this way, the fields and may be written asandInverting (34) and (35) we obtainWe can show thatand

The operators , , , and play a crucial role in the particle interpretation of the quantized field theory. First, define the operatorsandIt is simple to show that and commute In analogous sense, In this case, the eigenstates of these operators may be used to form a basis. Let us denote the eigenvalue of by and the eigenvalue of by ; i.e.,And now using the commutation relations , , , and , we findEquations (44) and (45) tell us that if the state has eigenvalue , the states and are eigenstates of with respective eigenvalues and . And analogously, we note that (46) and (47) tell us that if the state has eigenvalue , the states and are eigenstates of with respective eigenvalues and . So, the operators and are interpreted as creation and annihilation operators of particles, respectively. Then, analogously, and can be interpreted as creation and annihilation operators of antiparticles, respectively.

Using the creation and annihilation operators, the Hamiltonian of scalar fields in phase space can be written by

We can also show that the particles that are the quantum of the Klein-Gordon field obey the Bose-Einstein statistics. For this, note that

The connection between the solution of free Klein-Gordon equation, , and the canonical quantization formalism is given by

In sequence, we establish the association between Green function given in (21) and the expression . For this purpose, we consider the Green functionin which it can be written in the formwhere . Using Cauchy Theorem we haveIn order, substituting (34) and (35) in , we obtainwhere the Heaviside function is defined as for and for . Then, using (37) and (38) we obtainWe then haveEquation (56) shows us the connection between the propagator and Green function in phase space.