Abstract

The Fermi-Dirac-type or Bose-Einstein-type integrals can be transformed into two convergent real-convolution integrals. The transformation simplifies the integration process and may ultimately produce a complete analytical solution without recourse to any mathematical approximations. The real-convolution integrals can either be directly integrated or be transformed into the Laplace Transform inversion integral in which case the full power of contour integration becomes available. Which method is employed is dependent upon the complexity of the real-convolution integral. A number of examples are introduced which will illustrate the efficacy of the analytical approach.

1. Introduction

This article presents an extension to the method developed by J. A. Selvaggi and J. P. Selvaggi [1] for analytically evaluating Fermi-Dirac-type and Bose-Einstein-type integrals. The Fermi-Dirac and Bose-Einstein integrals occupy an important role in areas such as solid-state physics and statistical mechanics. There exists numerous approximate analytical methods for evaluating these integrals, but none of the published methods give a general technique for analytically evaluating these integrals valid for the full range of the degeneracy parameter. This article illustrates a general method for attacking these integrals using real convolution.

The right-hand side of (1) and (2) will be defined as Fermi-Dirac-type integral and the Bose-Einstein-type integral, respectively.Analytical evaluation of these integrals yields the functions and . These functions will be defined as the Fermi-Dirac function and the Bose-Einstein function, respectively. The parameter, , is called the degeneracy parameter, a term encountered in statistical mechanics. However, as far as the integrals in (1) and (2) are concerned, represents any real number. In general, integrals of this type do not allow for closed-form solutions in terms of elementary functions. This article introduces a general method for analytically evaluating the integrals given in (1) and (2) for various functions, . The denominator of the integrands in (1) or (2) is exactly that found in the familiar Fermi-Dirac [2–4] or Bose-Einstein integrals [5, 6]. These integrals are often encountered in statistical and quantum statistical mechanics [7–9]. The authors will mainly consider the Fermi-Dirac functions and Bose-Einstein functions within that domain for which . If , (1) and (2) may be solved by elementary methods.

Numerous techniques have been employed to analytically approximate and numerically evaluate the half-order Fermi-Dirac functions [2, 10–18] and half-order Bose-Einstein functions [5, 17, 18] (see Appendix). A relatively new representation for these integrals, for , is the Polylogarithm function [19–22]. This function has been studied extensively in the literature. In fact, mathematical software such as Mathematica [23] uses a Polylogarithm algorithm to numerically compute the Fermi-Dirac and Bose-Einstein integrals. However, the authors will illustrate that the application of real convolution allows for the complete analytical evaluation of the integrals in (1) and (2) for a wide range of functions, . The authors have already employed this technique [1] to analytically evaluate the integral in (1) for the well-known and important case of the half-order Fermi-Dirac functions where . A few examples will be considered which will help to illustrate the efficacy of the method. Each solution was numerically checked by employing Mathematica [23] and other numerical algorithms.

2. Theoretical Development

Rewrite the integrals given in (1) and (2) in terms of two convergent real-convolution integrals [24]. The observation that real convolution can be employed is the main focus of this article. In fact, once the integrals are transformed into the proper real-convolution form, the difficulty in analytically evaluating (1) and (2) may be substantially reduced.

In order to see that (1) and (2) can each be transformed into two convergent real-convolution integrals requires that each integral be put into the proper form. To this end, rewrite (1) and (2) as follows:valid .

The denominators in each of the integrals in (3) and (4) can be expanded in a binomial expansion. Each expansion results in a convergent integral within its limits of integration. Employing (3) and expanding the denominator of both integrals in their appropriate binomial expansion yieldsLikewise, (4) can be rewritten as

Depending upon the complexity of the function, , direct integration may be possible. However, the authors will develop the necessary mathematical machinery employing the Laplace Transform inversion integral and contour integration of complex variable theory in order to analytically evaluate (5) and (6). The two integrals within the summation in (5), for example, are real-convolution integrals [24] defined as follows:where is defined as the Laplace Transform of . Both expressions are valid for One can eventually relax the restriction on to include . Substituting (7) into (5) yields the following:Equation (8) represents an exact alternative expression for (1). The only restriction put upon is that it must be a function which allows the integral in (1) to be convergent. Of course, must have a Laplace Transform. The same procedure illustrated above yields the following expression for the Bose-Einstein-type integral.

The first integral, shown in (8) or (9), may be quite simple for practical problems if is an analytically integrable function. The second integral, shown in (8) or (9), is the inverse Laplace Transform [24–26] defined as follows:where

The contour defined by the limits of integration in (10a) is called the Bromwich Contour [24–26]. Of course, there is no guarantee that the analytical evaluation of the inversion integral of (10a) will be an easy task. However, for many practical problems found in the literature, this appears not to be a problem.

3. Application of Real Convolution

3.1. Example 1

This simple example is used to verify the method developed in Section 2. Let and evaluate the expression for the Fermi-Dirac function by employing (8). The result is as follows:

Evaluate the inversion integral in by applying the theory of residues of complex variable theory. This is accomplished by choosing the appropriate contour in the complex plane. Figure 1 represents just one possible contour chosen to evaluate the integral in . The contour is closed in the left-hand plane in order to ensure convergence.

Figure 1 

Contour used for Examples 1 and 2.

Employing the contour of Figure 1 yields the following:The integral around path 2 for the contour of Figure 1 contributes zero due to Jordan’s Lemma [25]. We now have the following expression valid :

Case 1 ().

Case 2 ().

Case 3 (). The Fermi-Dirac function, , for any value of can easily be evaluated. Employing (5), instead of (8), for yields the following: Alternatively, (5) can be employed to evaluate for any . However, employing contour integration avails one of all the mathematical machineries of complex variable theory and allows one to tackle a wide range of integrals that may otherwise be rather complicated to evaluate by alternative methods. The same analysis can be employed to analytically evaluate the Bose-Einstein function, , for .

3.2. Example 2

As a second example, consider a slightly more complicated function. Let , and find the expression for the Fermi-Dirac function. Employing (8) and using the contour of Figure 1 yield the following: The same analysis can be used to compute the Bose-Einstein function by employing (6) or (9).

3.3. Example 3

Consider an even more difficult problem. Substituting into (1) and (2) yields the well-known half-order Fermi-Dirac function, , and the half-order Bose-Einstein function, , respectively (see Appendix). The half-order Fermi-Dirac function has already been analytically evaluated by J. A. Selvaggi and J. P. Selvaggi [1]. Let us attempt to analytically evaluate the half-order Bose-Einstein function, , and use the result to find an alternative expression for the half-order Fermi-Dirac function not discussed in J. A. Selvaggi and J. P. Selvaggi [1]. The half-order Bose-Einstein function is given by valid The Laplace Transform of is . Employ (9) to evaluate the integral in as follows:

The analytical evaluation of the inversion integral given in is expedited by employing the contour shown in Figure 2. The authors call this the Fermi-Dirac contour because of its utility in aiding in the analytical evaluation of the half-order Fermi-Dirac functions, and . Once again, the Fermi-Dirac contour is closed in the left-hand plane in order to ensure convergence.

Figure 2 

Fermi-Dirac contour.

Employing contour integration in the complex plane and applying the theory of residues yield the following: Only the line integrals along paths 1 (Bromwich Contour), 3, and 5 in Figure 2 contribute a nonzero quantity to the closed line integral on the left-hand side of . The closed line integral on the left-hand side of encloses only simple poles since the branch point at the origin has been excluded from the contour of integration. The mathematical details are found in J. A. Selvaggi and J. P. Selvaggi [1]. The result is as follows:After simplifying the algebra, the Inverse Laplace Transform becomes

Once again, the mathematical details used in obtaining are given in J. A. Selvaggi and J. P. Selvaggi [1]. Employing and yields the following half-order Bose-Einstein function.The functions and are the Complimentary and Imaginary Error functions, respectively. The evaluation of is solved by elementary methods and will not be discussed in this article. The half-order Fermi-Dirac function is found by employing the following duplication formula:This expression is discussed in Clunie [5] and Dingle [6], and it links the Bose-Einstein functions to the Fermi-Dirac functions. When and , the following expression is found:Employing and yields the half-order Fermi-Dirac function as follows:Equation can easily be checked by the application of (8). In doing so, one obtains [1]

Equations and yield different-looking results but are actually identities. Either or can be used to define the half-order Fermi-Dirac function. Alternatively, (5) and (6) could be used to analytically evaluate the half-order Fermi-Dirac function or the half-order Bose-Einstein function, respectively, without employing contour integration.

3.4. Example 4

As a final example, and the most difficult of the four examples discussed in this article, the authors will analytically evaluate the incomplete half-order Fermi-Dirac function [27] defined as follows:valid and . Rewrite as follows:To evaluate , let in the second integral of . The result is as follows:Some care must be taken when considering . There are three cases which need to be considered. These cases are as follows.

Case 1. Find .

Case 2. Find .

Case 3. Find .

The authors will only analyze Case 1 since the other cases follow the same procedure. One can rewrite , employing , as follows:An expression for the half-order Fermi-Dirac function is given by . Evaluate using (8) with given byEmploying , , and (8) yields the following expression for : whereTake note that in (8) has been replaced by in the evaluation of . This is true because the effective degeneracy parameter in is . Evaluate by employing the Fermi-Dirac contour and substituting the result in . This yields the following: Finally, employing , , and yields the analytical solution for the incomplete half-order Fermi-Dirac function valid and .The result given by is easily checked numerically by employing Mathematica [23]. Also, it is in complete numerical agreement with that published by Keller and Fenwick [27]. The authors believe that exists nowhere else in the published literature. It is a simple matter to repeat the process to analytically evaluate the incomplete half-order Bose-Einstein function.

We leave it to the interested reader to verify that the incomplete half-order Fermi-Dirac functions for Cases 2 and 3, respectively, are as follows: