I'm programming a neural field with numpy and for a map of 100*100 neurons, I need to manage a 10000*10000 connections map.
So I create my connection map with meshgrid and I try to applicate an adaptation of Mexican Hat fonction. Here, you have the code you can try: if you put
taille = 60 or
taille = 70 (the width of the neural map), it will work (on my PC, it's ok) but, if you try with
taille = 100, you obtain a MemoryError.
import numpy as np def connection_map4(width, se1, se2, K, inh): x = np.arange(0, width**2, 1) y = np.arange(0, width**2, 1) X,Y = np.meshgrid(x, y) print "Meshgrid cree" A1 = 1.0 + inh A2 = inh # exp(|x-xc|/b + |y-yc|) -> Mexican Hat equation # 2D/1D transformation relation: i = width.y + x # ligne = (X/witdh - Y/width)**2 ligne = (X-Y)/width ## empirically, it's the division that doesn't pass. print "avant carre" ligne *= ligne print "ligne" colonne = (X%width-Y%width)**2 print "colonne" M1 = A1*np.exp(-( (colonne)/(2*se1**2) + (ligne)/(2*se2**2) ) ) print "Premiere operation finie" M2 = -A2*np.exp(-( (colonne)/(2*(K*se1)**2) + (ligne)/(2*(K*se2)**2) ) ) print "Seconde operation finie" return(M1+M2) taille = 100 connection_map4(taille, 7.5, 4.0, 2.0, 2.0)
Empirically, after some trials to debug, I have separated each operations on the meshgrid, and it seems that it is the division and the modulo that don't pass.
Is there solution to make this division? I don't really want to use a loop and slow down the computation.