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Parallel Processing Final Project Parallel FFT using to solve Poisson’s Equation. Amir Torjeman Nitay Shiran. Poisson’s Equation. The Fourier coefficients for function Φ:. Solving the Equation by DFT. Perform 2D DFT on both sides of the equation becomes:. The DFT.
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Parallel ProcessingFinal ProjectParallel FFT using to solve Poisson’s Equation Amir Torjeman Nitay Shiran
Poisson’s Equation The Fourier coefficients for function Φ:
Solving the Equation by DFT Perform 2D DFT on both sides of the equation becomes:
The DFT The problem: huge number of calculations: O(N^2) The solution: FFT: Fast DFT algorithm
FFT: Decimation in time: RADIX2 Assume: N=2^d Use: Recursive formula: 1- divide series into 2 series: fodd,feven 2- perform FFT to each serie.(recursive part) 3- F= Feven+Fodd*exp(-2πi k/N) *(-1)^kd-1
FFT:cont. The Butterfly:
2D DFT • 2 dimensional transform: • Transform each row • Replace each row with its transform • Transform each column • Replace each column with its transform
2D DFT example FFT sinc Square cube
Parallel 2D DFT: Step 1: transform rows: Divide rows to num of process Process 0 Process 1 Process 2 Process 3 . . . . . .
Parallel 2D DFT: cont. Step 2: transform columns: Divide columns to num of process Process 0 Process 1 Process 2 Process 3 . . . . . .
Parallel Computing MPI Display MATLAB Syntsize MATLAB Our Work • Syntsize the source function f(x,y) in Matlab, and save in file. • Perform 2D parallel FFT in MPI on the source file. • Find the solution to Poisson’s equation. • save solution in file. • 3) Load file in MATLAB and display solution.
2D FFT example: Before: After:
THANK YOU! ANY QUESTIONS?