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Fu-Hu Liu 1 and Tian Tian 1 and Jian-Xin Sun 1,2 and Bao-Chun Li 1

Academic Editor:Dugan O'Neil

1, Institute of Theoretical Physics, Shanxi University, Taiyuan, Shanxi 030006, China
2, School of Physics and Electronic Science, Shanxi Datong University, Datong, Shanxi 037009, China

Received 1 November 2013; Accepted 20 February 2014; 8 April 2014

This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited. The publication of this article was funded by SCOAP³ .

1. Introduction

Due to the complexity of high energy collisions, it is impossible to measure all quantities and characteristics. Instead, some quantities and characteristics can be measured by experiment [1], while others can be obtained from the theoretical explanations based on the experimental results.

In experiments, high energy proton-proton ( p p ), proton-nucleus ( p A ), deuteron-nucleus ( d A ), and nucleus-nucleus ( A A ) collisions have been performed at available accelerators such as the Super Proton Synchrotron (SPS) [2-4] and colliders such as the Relativistic Heavy Ion Collider (RHIC) [5-8] and the Large Hadron Collider (LHC) [9-12]. Some quantities and characteristics such as the pseudorapidity (or rapidity) distributions, transverse momentum distributions, azimuthal correlations, flow effects, and some other interesting information have been obtained [13].

A lot of models were introduced in the past several decades. Different phenomenological mechanisms including initial interactions, intermediate processes, and final-state statistical laws have been proposed [14-19]. In a workshop held a few years ago at the CERN Theory Institute [20], many models reported their predictions for the heavy ion program at the LHC based on the explanations of the experimental results at the RHIC. Recently, some of the models are tested by p p , p A , and A A collisions at the LHC. Meanwhile, these models are further tested in p p , p A , d A , and A A collisions at the RHIC and SPS.

In the past years, we suggested a multisource thermal model [21-23] to describe the (pseudo)rapidity distributions, multiplicity distributions, transverse momentum distributions, azimuthal distributions, flow effects, and so forth. Some interesting quantities such as the temperature, speed of sound, and number of sources are obtained. It is noticed that some quantities and characteristics are related to others. Usually, based on a few distributions, other distributions can be obtained due to some modelling assumptions.

Very recently, the NA61/SHINE Collaboration reported the negatively charged pion productions in inelastic p p collisions at 20-158 GeV/c at the SPS [1]. The rapidity spectrums are parameterized by the sum of two Gaussian functions symmetrically displaced with respect to midrapidity. It is interesting for us to give a further test for the multisource thermal model by using the rapidity spectrums in p p collisions at SPS momenta (energies). According to the rapidity spectrums, we hope some other distributions can be obtained by the model.

In this paper, in the framework of the multisource thermal model [21-23], we analyze the rapidity spectrums in p p collisions measured by the NA61/SHINE Collaboration at the SPS [1]. Then, a series of other distributions are obtained due to the description of rapidity spectrums.

2. The Model and Calculation Method

In the multisource thermal model [21-23], we assume that many emission sources are formed in high energy collisions. In rapidity space in the laboratory or center-of-mass reference frame, these sources distribute at different rapidity _{y x} and form a target cylinder in rapidity interval [ _{y T min ...} , _{y T max ...} ] and a projectile cylinder in rapidity interval [ _{y P min ...} , _{y P max ...} ] , respectively. Because of the symmetry in p p collision, we have [ _{y T min ...} = - _{y P max ...} ] and [ _{y T max ...} = - _{y P min ...} ] .

In the rest frame of a given source, we can use different formalizations to describe the production of particles. For example, we can use the relativistic ideal gas model to give a description for the source. Then, we have the momentum ^{p [variant prime]} distribution of particles to be [figure omitted; refer to PDF] where C = ( 1 / ^{m 0 2} T ) ( 1 / _{K 2} ( _{m 0} / T ) ) is the normalization constant, _{K 2} ( _{m 0} / T ) is the modified Bessel function of order 2, _{m 0} is the rest mass of the considered particle, n is the particle number, and T is the temperature parameter of the source. The particles are assumed to emit isotropically in the rest frame of the source. Then, the distributions of emission angle ^{θ [variant prime]} and the azimuth ^{[varphi] [variant prime]} can be given by _f^{_{θ [variant prime]}} ( ^{θ [variant prime]} ) = ( 1 / 2 ) sin ^{θ [variant prime]} and _f^{_{[varphi] [variant prime]}} ( ^{[varphi] [variant prime]} ) = 1 / ( 2 π ) , respectively.

Let ^{p z [variant prime]} , ^{p T [variant prime]} , ^{p x [variant prime]} , ^{p y [variant prime]} , ^{m T [variant prime]} , ^{E [variant prime]} , ^{y [variant prime]} , and ^{η [variant prime]} denote, respectively, the longitudinal momentum, transverse momentum, x -component of momentum, y -component of momentum, transverse mass, energy, rapidity, and pseudorapidity of a considered particle in the rest frame of the considered source. In the Monte Carlo calculation, let _{r 1,2 , 3} denote, respectively, random numbers distributed evenly in [ 0,1 ] . The value of ^{p [variant prime]} satisfies [figure omitted; refer to PDF]

For other quantities, we have ^{θ [variant prime]} = arctan [ 2 _{r 2} ( 1 - _{r 2} ) / ( 1 - 2 _{r 2} ) ] if the right side of the equation is greater than 0; otherwise ^{θ [variant prime]} = arctan [ 2 _{r 2} ( 1 - _{r 2} ) / ( 1 - 2 _{r 2} ) ] + π . Further, we have some quantities such as ^{[varphi] [variant prime]} = 2 π _{r 3} , ^{p z [variant prime]} = ^{p [variant prime]} cos ... ^{θ [variant prime]} , ^{p T [variant prime]} = ^{p [variant prime]} sin ^{θ [variant prime]} , ^{p x [variant prime]} = ^{p T [variant prime]} cos ... ^{[varphi] [variant prime]} , ^{p y [variant prime]} = ^{p T [variant prime]} sin ^{[varphi] [variant prime]} , ^{m T [variant prime]} = ^{p T [variant prime] 2} + ^{m 0 2} , ^{E [variant prime]} = ^{p [variant prime] 2} + ^{m 0 2} = ^{p z [variant prime] 2} + ^{p T [variant prime] 2} + ^{m 0 2} = ^{p z [variant prime] 2} + ^{m T [variant prime] 2} , and ^{y [variant prime]} ...1; ( 1 / 2 ) ln ... [ ( ^{E [variant prime]} + ^{p z [variant prime]} ) / ( ^{E [variant prime]} - ^{p z [variant prime]} ) ] .

In the laboratory or center-of-mass reference frame, let _{r 5,6} denote, respectively, random numbers distributed evenly in [ 0,1 ] ; we have the related quantities _{y x} = ( _{y T max ...} - _{y T min ...} ) _{r 5} + _{y T min ...} if _{r 6} < 0.5 , or _{y x} = ( _{y P max ...} - _{y P min ...} ) _{r 5} + _{y P min ...} if _{r 6} > 0.5 . Further, we have y = _{y x} + ^{y [variant prime]} , _{p T} = ^{p T [variant prime]} , _{p x} = ^{p x [variant prime]} , _{p y} = ^{p y [variant prime]} , _{m T} = ^{m T [variant prime]} , _{p z} = _{m T} sinh ... y , p = ^{p T 2} + ^{p z 2} , E = _{m T} cosh ... y , and θ = arctan ( _{p T} / _{p z} ) if _{p z} > 0 , or θ = arctan ( _{p T} / _{p z} ) + π if _{p z} < 0 . The pseudorapidity η ...1; - ln ... tan ( θ / 2 ) . Then, the probability distributions of the considered quantities and their correlations can be obtained. The space density distributions of p and _{p T} are ρ ( p ) = [ 1 / ( 4 π ^{p 2} n ) ] ( d n / d p ) and ρ ( _{p T} ) = [ 1 / ( 2 π _{p T} n ) ] ( d n / d _{p T} ) , respectively. Besides, some exchangeable quantities in the above expressions are _{p z} = ^{p z [variant prime]} cosh ... _{y x} + ^{E [variant prime]} sinh ... _{y x} , E = ^{p z [variant prime]} sinh ... _{y x} + ^{E [variant prime]} cosh ... ... _{y x} , and y ...1; ( 1 / 2 ) ln ... [ ( E + _{p z} ) / ( E - _{p z} ) ] .

Further, the velocity and corresponding longitudinal and transverse components of the particle can be given by β = p / E , _{β z} = _{p z} / E , and _{β T} = _{p T} / E , respectively. If we assume that the time interval from initial collision to the stage of freeze-out is _{t 0} , then we have the space coordinates x = _{t 0} _{β T} cos ... [varphi] , y = _{t 0} _{β T} sin [varphi] , z = _{r z} = _{t 0} _{β z} , _{r T} = ^{x 2} + ^{y 2} = _{t 0} _{β T} , and r = _{t 0} β . Thus, the probability distributions of the considered quantities and their correlations can be obtained. The space density distributions of r and _{r T} are ρ ( r ) = [ 1 / ( 4 π ^{r 2} n ) ] ( d n / d r ) and ρ ( _{r T} ) = [ 1 / ( 2 π _{r T} n ) ] ( d n / d _{r T} ) , respectively.

3. Comparison and Extraction

The NA61/SHINE Collaboration has measured the rapidity distributions and other features of negatively charged pions produced in 20-158 GeV/c p p collisions at the SPS [1]. It is shown that the rapidity spectrums are parameterized by the sum of two Gaussian functions symmetrically displaced with respect to midrapidity: [figure omitted; refer to PDF] where n , _{σ 0} , and _{y 0} are the normalization constant, distribution width for one Gaussian, and peak position parameter, respectively. The values with errors of the three parameters at different momenta are obtained by the NA61/SHINE Collaboration [1].

We can compare directly our modelling results with the experimental distribution function of the NA61/SHINE Collaboration [1]. In Figure 1, the rapidity and pseudorapidity distributions of negatively charged pions produced in (a) 158, (b) 80, (c) 40, and (d) 20 GeV/c p p collisions are displayed. The two-dotted curves represent the rapidity distribution range of the NA61/SHINE experiment [1]. The solid curves which fall into the experimental distribution range are our modelling results obtained by using the multisource thermal model. The modelling results in fact give almost whole superpositions to the two-Gaussian functions which are not presented in the panels. Correspondingly, the modelling results on the pseudorapidity distributions are given by the dashed curves. In the calculation, we have used the Monte Carlo technique and ^{χ 2} -testing method. The values of parameters T , _{y P max ...} ( = - _{y T min ...} ) , and _{y P min ...} ( = - _{y T max ...} ) for Figures 1(a), 1(b), 1(c), and 1(d) are listed in Table 1. One can see that the model describes the experimental rapidity distributions of negatively charged pions produced in p p collisions at the SPS. The pseudorapidity distribution has a lower peak and wider range than those of the rapidity distribution. The temperature increases and the rapidity shift _{y P max ...} increases with increase of the incident momentum, and the rapidity shift _{y P min ...} does not change with the momentum.

Table 1: Values of parameters corresponding to the solid curves in Figure 1.

Figure	T (GeV)	_{y P max ...}	_{y P min ...}
Figure 1(a)	0.150 ± 0.012	2.00 ± 0.02	- 0.21 ± 0.01
Figure 1(b)	0.145 ± 0.012	1.71 ± 0.02	- 0.21 ± 0.01
Figure 1(c)	0.141 ± 0.011	1.43 ± 0.01	- 0.21 ± 0.01
Figure 1(d)	0.138 ± 0.011	1.20 ± 0.01	- 0.21 ± 0.01

Rapidity and pseudorapidity distributions of negatively charged pions produced in (a) 158, (b) 80, (c) 40, and (d) 20 GeV/c p p collisions. The two-dotted curves represent the rapidity distribution range of the NA61/SHINE experiment [1]. The solid and dashed curves are our modelling results on the rapidity and pseudorapidity distributions.

(a) 158 GeV/c p p , ^{π -}

[figure omitted; refer to PDF]

(b) 80 GeV/c p p , ^{π -}

[figure omitted; refer to PDF]

(d) 20 GeV/c p p , ^{π -}

[figure omitted; refer to PDF]

By using the above parameter values, we can obtain some interesting features for other quantities. Figure 2 presents the distributions of (a) p , (b) _{p z} , (c) _{p T} , and (d) _{m T} - _{m 0} of negatively charged pions produced in p p collisions at the SPS. The solid, dotted, dashed, and dotted-dashed curves correspond to the results at 158, 80, 40, and 20 GeV/c, respectively. The circles in Figure 2(b) represent the contribution of the target cylinder to _{p z} distribution at 158 GeV/c, while the contribution of the projectile cylinder is symmetrical. For the p , _{p T} , and _{m T} - _{m 0} distributions, both the contributions of the target and projectile cylinders are the same and equal to a half of the distributions. Similarly, Figure 3 presents the distributions of (a) E , (b) β , (c) _{β z} , and (d) _{β T} of the negatively charged pions. The circles in Figure 3(c) represent the contribution of the target cylinder to _{β z} distribution at 158 GeV/c, while the contribution of the projectile cylinder is symmetrical. For the E , β , and _{β T} distributions, both the contributions of the target and projectile cylinders are the same and equal to a half of the distributions.

Distributions of (a) p , (b) _{p z} , (c) _{p T} , and (d) _{m T} - _{m 0} of negatively charged pions produced in p p collisions at the SPS. The solid, dotted, dashed, and dotted-dashed curves correspond to the results at 158, 80, 40, and 20 GeV/c, respectively. The circles in Figure 2(b) represent the contribution of the target cylinder to _{p z} distribution at 158 GeV/c.