P. Chung Nuclear Chemistry, SUNY, Stony Brook

Evidence for a long-range pion emission source in Au+Au Collisions at P. Chung Nuclear Chemistry, SUNY, Stony Brook

Outline • Motivation • Brief Review of Correlation analysis methods • Data Analysis & Results • Correlation functions • Source functions • Source parameters & dependence (centrality, mT, etc) • Conclusion/s

hadronic phase and freeze-out QGP and hydrodynamic expansion initial state pre-equilibrium hadronization Motivation Conjecture of collisions at RHIC : Courtesy S. Bass Which observables & phenomena connect to the de-confined stage?

Motivation One Scenario: Increased System Entropy that survives hadronization QGP and hydrodynamic expansion Expectation: A de-confined phase leads to an emitting system characterized by a much larger space-time extent thanwould be expected from a system which remained in the hadronic phase

Experimental Setup PHENIX Detector Several Subsystems exploited for the analysis Excellent Pid is achieved

Cuts Dphi (rad) Dz (cm)

Analysis Summary • Image analysis in PHENIX Follows three basic steps. • Track selection • Evaluation of the • Correlation Functions (with pair-cuts etc.) • Imaging of • Correlation functions • Fits to correlation function Dphi >0.02 dz < 5 cm Dphi >0.01 dz > 5 cm

Analysis Technique Correlation Function Direct Fits to the Correlation Functions Imaging Source Function

Emitting source Imaging Technique Technique Devised by: D. Brown, P. Danielewicz, PLB 398:252 (1997).PRC 57:2474 (1998). Inversion of Linear integral equation to obtain source function 1D Koonin Pratt Encodes FSI Source function (Distribution of pair separations) Correlation function Inversion of this integral equation == Source Function

Imaging Inversion procedure

PHENIX Preliminary Results • Non Gaussian tail observed in source function

E895 PHENIX Preliminary E895 Results • Non Gaussian tail NOT observed at the AGS

Correlation Fits [Parameterized form for S(r)] + convolution with kernel  calculated C(q) Measured correlation function Minimize Chi-squared Parameters of the source function

Extraction of Source Parameters Fit Function (Pratt et al.) Radii Pair Fractions Bessel Functions This fit function allows extraction of both the short- and long-range components of the source image

Quick Test - 1 Input source function recovered Procedure is Robust !

Fitting correlation functions Kinematics “Spheroid/Blimp” Ansatz Brown & Danielewicz PRC 64, 014902 (2001) “spheroid/Blimp” parameters

Sensitivity Tests Fix RT = R and vary a Source parameters Recovered

Sensitivity Tests Fix a and vary R Source parameters Recovered

PHENIX Preliminary Results • Spheroid source function yield excellent fits to data

Comparison of Source Functions Same source functions from different parameterization

Short and long-range components of the source T. Csorgo M. Csanad Short-range  Long-range 

Short and long-range components of the source T. Csorgo M. Csanad

Short and long-range components of the source Core Halo assumption T. Csorgo M. Csanad Expt 

Next Steps; 3D imaging/moment fitting Higher l moments  angular deformation of source

Next Steps; 3D imaging/moment fitting Simulation results Solid proof of principle

Summary • First Extensive study of two-pion 1D source • images in Au+Au collisions at RHIC • Results indicate evidence for non-Gaussian tail • Long-range behavior of source function ~ 3x short-range • Centrality dependence of radius parameters and lambda • Fraction in compatible with simple estimate of omega decay Further detailed 3D analysis in progress to pin-down origin of long-range behavior

P. Chung Nuclear Chemistry, SUNY, Stony Brook