cpython/Lib/zmod.py

# module 'zmod'

# Compute properties of mathematical "fields" formed by taking
# Z/n (the whole numbers modulo some whole number n) and an 
# irreducible polynomial (i.e., a polynomial with only complex zeros),
# e.g., Z/5 and X**2 + 2.
#
# The field is formed by taking all possible linear combinations of
# a set of d base vectors (where d is the degree of the polynomial).
#
# Note that this procedure doesn't yield a field for all combinations
# of n and p: it may well be that some numbers have more than one
# inverse and others have none.  This is what we check.
#
# Remember that a field is a ring where each element has an inverse.
# A ring has commutative addition and multiplication, a zero and a one:
# 0*x = x*0 = 0, 0+x = x+0 = x, 1*x = x*1 = x.  Also, the distributive
# property holds: a*(b+c) = a*b + b*c.
# (XXX I forget if this is an axiom or follows from the rules.)

import poly


# Example N and polynomial

N = 5
P = poly.plus(poly.one(0, 2), poly.one(2, 1)) # 2 + x**2


# Return x modulo y.  Returns >= 0 even if x < 0.

def mod(x, y):
	return divmod(x, y)[1]


# Normalize a polynomial modulo n and modulo p.

def norm(a, n, p):
	a = poly.modulo(a, p)
	a = a[:]
	for i in range(len(a)): a[i] = mod(a[i], n)
	a = poly.normalize(a)
	return a


# Make a list of all n^d elements of the proposed field.

def make_all(mat):
	all = []
	for row in mat:
		for a in row:
			all.append(a)
	return all

def make_elements(n, d):
	if d == 0: return [poly.one(0, 0)]
	sub = make_elements(n, d-1)
	all = []
	for a in sub:
		for i in range(n):
			all.append(poly.plus(a, poly.one(d-1, i)))
	return all

def make_inv(all, n, p):
	x = poly.one(1, 1)
	inv = []
	for a in all:
		inv.append(norm(poly.times(a, x), n, p))
	return inv

def checkfield(n, p):
	all = make_elements(n, len(p)-1)
	inv = make_inv(all, n, p)
	all1 = all[:]
	inv1 = inv[:]
	all1.sort()
	inv1.sort()
	if all1 == inv1: print 'BINGO!'
	else:
		print 'Sorry:', n, p
		print all
		print inv

def rj(s, width):
	if type(s) <> type(''): s = `s`
	n = len(s)
	if n >= width: return s
	return ' '*(width - n) + s

def lj(s, width):
	if type(s) <> type(''): s = `s`
	n = len(s)
	if n >= width: return s
	return s + ' '*(width - n)
Initial revision 1991-01-01 14:11:14 -04:00			`# module 'zmod'`

			`# Compute properties of mathematical "fields" formed by taking`
			`# Z/n (the whole numbers modulo some whole number n) and an`
			`# irreducible polynomial (i.e., a polynomial with only complex zeros),`
			`# e.g., Z/5 and X**2 + 2.`
			`#`
			`# The field is formed by taking all possible linear combinations of`
			`# a set of d base vectors (where d is the degree of the polynomial).`
			`#`
			`# Note that this procedure doesn't yield a field for all combinations`
			`# of n and p: it may well be that some numbers have more than one`
			`# inverse and others have none. This is what we check.`
			`#`
			`# Remember that a field is a ring where each element has an inverse.`
			`# A ring has commutative addition and multiplication, a zero and a one:`
			`# 0x = x0 = 0, 0+x = x+0 = x, 1x = x1 = x. Also, the distributive`
			`# property holds: a(b+c) = ab + b*c.`
			`# (XXX I forget if this is an axiom or follows from the rules.)`

			`import poly`


			`# Example N and polynomial`

			`N = 5`
			`P = poly.plus(poly.one(0, 2), poly.one(2, 1)) # 2 + x**2`


			`# Return x modulo y. Returns >= 0 even if x < 0.`

			`def mod(x, y):`
			`return divmod(x, y)[1]`


			`# Normalize a polynomial modulo n and modulo p.`

			`def norm(a, n, p):`
			`a = poly.modulo(a, p)`
			`a = a[:]`
			`for i in range(len(a)): a[i] = mod(a[i], n)`
			`a = poly.normalize(a)`
			`return a`


			`# Make a list of all n^d elements of the proposed field.`

			`def make_all(mat):`
			`all = []`
			`for row in mat:`
			`for a in row:`
			`all.append(a)`
			`return all`

			`def make_elements(n, d):`
New == syntax 1992-01-01 15:35:13 -04:00			`if d == 0: return [poly.one(0, 0)]`
Initial revision 1991-01-01 14:11:14 -04:00			`sub = make_elements(n, d-1)`
			`all = []`
			`for a in sub:`
			`for i in range(n):`
			`all.append(poly.plus(a, poly.one(d-1, i)))`
			`return all`

			`def make_inv(all, n, p):`
			`x = poly.one(1, 1)`
			`inv = []`
			`for a in all:`
			`inv.append(norm(poly.times(a, x), n, p))`
			`return inv`

			`def checkfield(n, p):`
			`all = make_elements(n, len(p)-1)`
			`inv = make_inv(all, n, p)`
			`all1 = all[:]`
			`inv1 = inv[:]`
			`all1.sort()`
			`inv1.sort()`
New == syntax 1992-01-01 15:35:13 -04:00			`if all1 == inv1: print 'BINGO!'`
Initial revision 1991-01-01 14:11:14 -04:00			`else:`
			`print 'Sorry:', n, p`
			`print all`
			`print inv`

			`def rj(s, width):`
			if type(s) <> type(''): s = `s`
			`n = len(s)`
			`if n >= width: return s`
			`return ' '*(width - n) + s`

			`def lj(s, width):`
			if type(s) <> type(''): s = `s`
			`n = len(s)`
			`if n >= width: return s`
			`return s + ' '*(width - n)`