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62 lines
1.5 KiB
62 lines
1.5 KiB
# Primitive Root of Unity
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def get_primitive_root_of_unity(F, n):
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# using the method described by Thomas Pornin in
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# https://crypto.stackexchange.com/a/63616
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q = F.order()
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for k in range(q):
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if k==0:
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continue
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g = F(k)
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# g = F.random_element()
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if g==0:
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continue
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w = g ^ ((q-1)/n)
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if w^(n/2) != 1:
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return g, w
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# Roots of Unity
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def get_nth_roots_of_unity(n, primitive_w):
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w = [0]*n
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for i in range(n):
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w[i] = primitive_w^i
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return w
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# fft (Fast Fourier Transform) returns:
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# - nth roots of unity
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# - Vandermonde matrix for the nth roots of unity
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# - Inverse Vandermonde matrix
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def fft(F, n):
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g, primitive_w = get_primitive_root_of_unity(F, n)
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w = get_nth_roots_of_unity(n, primitive_w)
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ft = matrix(F, n)
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for j in range(n):
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row = []
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for k in range(n):
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row.append(primitive_w^(j*k))
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ft.set_row(j, row)
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ft_inv = ft^-1
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return w, ft, ft_inv
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# Fast polynomial multiplicaton using FFT
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def poly_mul(fa, fb, F, n):
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w, ft, ft_inv = fft(F, n)
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# compute evaluation points from polynomials fa & fb at the roots of unity
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a_evals = []
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b_evals = []
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for i in range(n):
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a_evals.append(fa(w[i]))
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b_evals.append(fb(w[i]))
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# multiply elements in a_evals by b_evals
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c_evals = map(operator.mul, a_evals, b_evals)
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c_evals = vector(c_evals)
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# using FFT, convert the c_evals into fc(x)
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fc_coef = c_evals*ft_inv
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fc2=P(fc_coef.list())
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return fc2, c_evals
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