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Advanced Neutronics Modeling GNEP Fast Reactor Working Group Meeting Argonne, IL August 22, 2007 M. A. Smith, C. Rabiti, D. Kaushik, C. Lee, and W. S. Yang Argonne National Laboratory
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2 Current fast reactor physics analysis tools were developed during the 1985-94 time period, as part of the IFR/ALMR programs Current approach is based on cumbersome multi-step calculations –Cross sections self-shielded at ultra-fine group (~2000+) level with 0D/1D spectrum calculation –Spatial collapse to form regional broad group cross sections with 1D/2D flux calculation –Broad group (~33) nodal diffusion or transport 3D core calculations with homogenized nodes –Number of design calculations (fuel cycle analysis, heating calculation, reactivity coefficient calculation, control rod worth and shutdown margin evaluation, etc.) based on broad group 3D core calculation Current tools are judged to be adequate to begin the design process –Extensive critical experiment and reactor operation database exists –Validation and capabilities have evolved in parallel Current Status
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3 However, significant improvements are needed to allow more accurate and economical design procedures –Significant efforts are also required to utilize all the existing design tools on modern computer frameworks Improved accuracy is needed to meet burner design challenges –Radial blanket typically replaced by reflector Many critical experiments (BFS-62, MUSE-4) exhibit problems in accurate prediction of reaction rates in the immediate reflector region Important for bowing (safety) and shielding considerations –High leakage configurations also challenge design methods Transport effects are magnified Key reactivity coefficients (void worth) under-predicted –Improved pin power and flux distributions Accurate pin power distributions for T/H calculations Accurate pin flux distributions for isotopic depletion prediction Improvement Needs
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4 Applicable range of problems needs to be extended –Modeling of structure deformation (for accurate reactivity feedback) –Neutron streaming in voided coolant condition –Control assembly worth (relatively large heterogeneity effects) –Shielding calculations (severe spectral transitions) A modern, integrated design tool is crucial to improve the current design procedure, which is time-consuming and inefficient –Eliminate piecemeal nature vulnerable to shortcomings in human performance, organizational skills, and project management Improved automation of data transfers among codes/modules –Greatly improve the turn-around time for design iterations –Utilize advances in computer science and software engineering Improved modeling in the integrated design tool allows radical improvements –Ability to optimize the design (e.g., reduce nominal peak temperatures) –New knowledge to alter and redirect the design features and approach Improvement Needs (Cont’d)
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5 The final objective is to produce an integrated, advanced neutronics code that allows the high fidelity description of a nuclear reactor and simplifies the multi- step design process –Integration with thermal-hydraulics and structural mechanics calculations Allow uninterrupted applicability to core design work –Phased approach for multi-group cross section generation Simplified multi-step schemes to online generation –Adaptive flux solution options from homogenized assembly geometries to fully explicit heterogeneous geometries in serial and parallel environments Allow the user to smoothly transition from the existing homogenization approaches to the explicit geometry approach Rapid turn-around time for scoping design calculations Detailed models for design refinement and benchmarking calculations Unified geometrical framework –Finite element analysis to work within the existing tools developed for structural mechanics and thermal-hydraulics –Domain decomposition strategies for efficient parallelization Objective and Approaches
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6 Adaptive Flux Solution Options Homogenized assembly Homogenized assembly internals Homogenized pin cells Fully explicit assembly
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7 Develop an initial working version (V.0) of deterministic neutron transport solver in general geometry –General geometry capability using unstructured finite elements –First order form solution using method of characteristics –Second order form solution using even-parity flux formulation –Parallel capability for scaling to thousands of processors –Adjoint capability for sensitivity and uncertainty analysis Targeted computational milestones –An ABR full subassembly with fine structure geometrical description for coupling with thermal-hydraulics calculation –A whole ABR configuration with pin-by-pin description Multi-group cross section generation –Develop an initial capability for investigating important physical phenomena and identifying the optimum strategies for coupling with the neutron transport code ANL techniques in the fast energy range ORNL techniques in the resonance range Work Scopes of FY07
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8 Unstructured finite element mesh capabilities have been implemented –CUBIT package is the primary mesh generation tool (hexahedral and tetrahedral elements) –Further research is required for reducing mesh generation efforts and robust merging of the meshes of individual geometrical components General Geometry Capability
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9 Accomplishments for Second Order Form Solutions PN2ND and SN2ND solvers have been developed to solve the steady-state, second-order, even-parity neutron transport equation –PN2ND: Spherical harmonic method in 1D, 2D and 3D geometries with FE mixed mesh capabilities –SN2ND: Discrete ordinates in 2D and 3D geometries with FE mixed mesh capabilities These second order methods have been implemented on large scale parallel machines –Linear tetrahedral and quadratic hexahedral elements –Fixed source and eigenvalue problems –Arbitrarily oriented reflective and vacuum boundary conditions –PETSc solvers are utilized to solve within-group equations Conjugate gradient method with SSOR and ICC preconditioners Other solution methods and preconditioners will be investigated –Synthetic diffusion acceleration for within-group scattering iteration –Power iteration method for eigenvalue problem Various acceleration schemes will be investigated
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10 More spatial refinement is necessary for VARIANT Serial computational performance is comparable to other codes –VARIANT P 5 was 2 minutes –PN2ND P 5 was ~4 hours –SN2ND S 3 was ~10 minutes –DFEM S 4 ~54 minutes (LANL 2001 ) Improper preconditioner is an issue –SSOR for PN2ND Reference 1.09515 ± 0.00040 (Rods out) Angular order VARIANTPN2NDSN2ND 11.075431.07335 31.094411.093051.09464 51.095771.09444 71.096141.09481 91.096281.09493 111.096361.094981.09485 231.09494 Error (pcm) 1-1982-2180 3-74-210-51 562-71 799-34 9113-22 11121-17-30 23-21 Initial Benchmarking Based Upon Takeda Benchmarks
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11 Four benchmark problems are being analyzed –All require P 7 or S 8 angular order –33, 100, and 230 groups are planned 30º symmetry core with homogenized assemblies –~40,000 spatial DOF ~100 processors 120º periodic core with homogenized assemblies –~400,000 spatial DOF ~500 processors 30º symmetry core with homogenized pin cells –1.7 million spatial DOF ~1000 processors Single assembly with explicit geometry –2.2+ million spatial DOF ~5000 processors ABTR Whole-Core Calculations
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12 30º Symmetry Core with Homogenized Assemblies VARIANT result is 12 pcm off with P 9 angular flux approximation –CPU time was 12 hours SN2ND was ran on Janus –S 10 solution took 8 hours on 1 processor PN2ND was ran with different XS –P 7 solution with SSOR took 1 hour on 132 processors MCNP1.01921±0.00004 Angular Order SN2ND 40,000 Error (pcm) 41.02548627 61.02040119 81.0200786 101.0198261
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13 120º Periodic Core with Homogenized Assemblies P 11 solution of PN2ND on 512 processors was 2.1 hour (total 1093 hours) MeTiS domain decomposition for 512 processors and 14th of 33 group flux solution Angular Order PN2ND 793,000 11.00941 31.02274 51.02417 71.02457 91.02472 111.02478
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14 Scalability Test of PN2ND Parallel performance (strong scaling) from 512 to 4096 Cray XT4 processors –120º periodic ABTR core with homogenized assemblies –33 group P 5 calculation –Mesh contains 587,458 quadratic tetrahedral elements and 793,668 vertices About 12 million space-angle degrees of freedom per energy group
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15 30º Symmetry Core with Homogenized Pin Cells MCNP 24 hours on 40 processors (or 40 days) SN2ND and PN2ND calculations under progress –PN2ND P3 was completed
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16 Accomplishments for First Order Form Solution MOCFE solver has been developed to solve the steady-state, first- order neutron transport equation –Method of characteristic in space and discrete ordinates in angle –Linear tetrahedral and quadratic hexahedral elements Utilizes the very efficient Moller-Trumbore algorithm to find intersection with triangle Surface of quadratic hexahedral element is meshed with 48 triangles –Synthetic diffusion acceleration with the use of PETSc parallel matrices and vectors Have performed ray tracing for meshes containing 1 million elements –Ray tracing accounts for a minor component of the total time –Fully scalable process Algorithm analysis for parallelization is ongoing Single assembly T/H coupling calculation is ready to go given computational time –Estimated time for the initial flux solution is 5 hours on 128 proc.
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17 Mesh Refinement Study of MOCFE on Takeda 1 Benchmark Max 0.01 cm 2 ray area and 80 angular directions
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18 Scalability Test of MOCFE on Takeda 4 Benchmark 85538 elements without synthetic diffusion acceleration
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19 Algebraic Collapsing Synthetic Acceleration of MOCFE
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20 Single Assembly Geometry One group, fixed source scoping study for T/H coupling calculation
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21 Multi-group Cross Section Generation Phased approach was adopted to allow uninterrupted applicability to core design –Tens of thousands groups are required for accurate representation of self- shielding effects –Near term goal is to use 50-500 energy groups Simplifies the existing multi-step cross section generation schemes –Improvements to resolved and unresolved resonances are underway Provide the user the option to choose the level of approximation –Online cross section generation Libraries of ultra-fine group smooth cross sections and resonance parameters (or point-wise XS) Utilize fine group MOCFE solutions –Fine group cross section libraries Functionalized XS data Subgroup method is being considered
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22 Multi-group Cross Section Generation (Cont’d) Starting set of methodologies –Above resolved resonance energy range Ultra-fine group methodologies of MC 2 -2 –Resolved resonance energy range Ultra-fine group calculation of MC 2 -2 with analytic resonance integrals using a narrow resonance approximation Hyper-fine group (almost point-wise) calculation of MC 2 -2 with RABANL integral transport method Point-wise resonance calculation using CENTRM (ORNL) –Thermal energy range CENTRM methodologies (ORNL) ENDF/B data processing –ETOE-2: create MC 2 -2 libraries –NJOY: point-wise resonance cross sections
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23 Multi-group Cross Section Generation (Cont’d) Update and testing of the ETOE-2/MC 2 -2 system –The MC 2 -2 code is currently being revised for eventual coupling with UNIC and use in a parallel computing environment FORTRAN 90 Current focus is on off-line cross section generation –Use of ENDF/B-VII.0 data Required coding changes to ETOE-2 Completed processing major actinides and structural material nuclides Preliminary tests of the ENDF/B-VII.0 libraries of MC 2 -2 –MC 2 -2/TWODANT R-Z modeling is compared with Monte Carlo R-Z –Good agreement within 0.25% ∆ρ for bigger systems with relatively soft spectrum (Big-10, ZPR-6, and ZPPR-21) –Overestimated multiplication factors by 0.22 ~ 0.35% ∆ρ for small systems (Flattop, Jezebel, and Godiva) –Good agreement of C/E ratios of spectral indices within 2.7% (Godiva and Jezebel)
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24 Preliminary Results of ENDF/B-VII.0 Data Assembly MCNP ± pcm TWODANT ∆ , pcm Flattop-251.00212 ± 35227 Flattop-Pu1.00072 ± 34235 Flattop-230.99921 ± 34257 Godiva0.99996 ± 32350 Jezebel-2400.99944 ± 31300 Jezebel-231.00007 ± 31279 Jezebel1.00028 ± 30216 Big-100.99513 ± 19-57 ZPR-6/6A0.99609 ± 2322 ZPR-6/70.98671 ± 22-126 ZPPR-21A0.99869 ± 20-153 ZPPR-21B0.99293 ± 2075 ZPPR-21C0.99923 ± 18-25 ZPPR-21D1.00345 ± 20253 ZPPR-21E1.00485 ± 20184 ZPPR-21F1.00612 ± 2011 IsotopeExperiment TWODANT C/E ratio * Godiva 0.165 ± 0.0020.973 ± 0.011 1.59 ± 0.030.987 ± 0.019 0.837 ± 0.0131.006 ± 0.015 1.402 ± 0.0250.989 ± 0.018 Jezebel 0.214 ± 0.0020.978 ± 0.011 1.578 ± 0.0270.987 ± 0.017 0.962 ± 0.0161.018 ± 0.016 1.448 ± 0.0290.986 ± 0.020 * C/E: calculated / experimental values
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25 Conclusions Code development is progressing well –ETOE-2 and MC 2 -2 are being revised –Second order solvers PN2ND and SN2ND have been developed Demonstrated good scalability to 4000 processors –First order solver MOCFE has been developed including synthetic acceleration scheme and quadratic hexahedral meshes –Adjoint solver has not been completed –Preconditioner study has yet to be completed Milestone calculations are primary area to be completed –Jaguar (Cray XT4 at ORNL) is being expanded and job queue is typically saturated We are very grateful of ORNL for the cpu time –BlueGene and JAZZ (ANL) are typically saturated –Production machines are not effective for code development Average 4-8 hour wait in the queue for scoping is problematic Purchase request for a small cluster is under progress –INCITE proposal was submitted in collaboration with ORNL for computer time on big leadership computers (XT4 and BlueGene/P)
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26 Plans for FY08 Further development of high fidelity neutronics solvers –Implement acceleration for steady state eigenvalue calculations –Optimize acceleration schemes based upon geometry and cross section data –Investigate strategy utilizing parallelization by group and space –Formalize user interface and cross section management Develop a time dependent solution capability (kinetics) Develop a multi-group cross section generation code based on the ETOE-2/MC 2 -2 methodologies for use in a parallel computing environment Interface the new cross section code with the neutronics solvers –Develop platform independent library interface of all key cross section data –Investigate online cross section generation Complete the process of ENDF/B-VII.0 for fast reactor analysis work Verification and validation –Systematic verification of multi-group cross section generation scheme –Benchmark using ZPR critical experiments for fast reactors ZPR 6-6a or ZPR 6-7
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