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Determining if there exists numbers n1, n2 in a, b and n3 in c such that n1 n2 = n3 [ftt, polynomi

Time:10-19

Hello I am working on a problem that seems to be out of my league so any tips, pointers to reading materials etc. are really appreciated. That being said here is the problem:

given 3 subsets of numbers a, b, c ⊆ {0, ..., n}. In nlog(n) check if there exists numbers n1, n2 in a, b and n3 in c where n1 n2 = n3.

I am given the hint to convert a and b to polynomial coefficients and to use polynomial multiplication using ftt to multiply the coefficients of a and b.

Now where I am stuck is after getting the result of the polynomial multiplication, what do I do next?

Thank you in advanced.

from numpy.fft import fft, ifft
from numpy import real, imag

def polynomial_multiply(a_coeff_list, b_coeff_list):
    # Return the coefficient list of the multiplication 
    # of the two polynomials 
    # Returned list must be a list of floating point numbers.
    # list from complex to reals by using the 
    # real function in numpy
    len_a = len(a_coeff_list)
    len_b = len(b_coeff_list)
    for i in range(len_a-1):
        b_coeff_list.append(0)
    for i in range(len_b-1):
        a_coeff_list.append(0)
    a_fft = fft(a_coeff_list)
    b_fft = fft(b_coeff_list)
    c = []
    for i in range(len(a_fft)):
        c.append(a_fft[i] * b_fft[i])
    inverse_c = ifft(c)
    return real(inverse_c)

# inputs sets a, b, c
# return True if there exist n1 in a, n2 in B such that n1 n2 in C
# return False otherwise
# number n which signifies the maximum number in a, b, c
def check_sum_exists(a, b, c, n):
    a_coeffs = [0]*n
    b_coeffs = [0]*n 
    # convert sets a, b into polynomials as provided in the hint
    # a_coeffs and b_coeffs should contain the result
    i = 0
    for item in a:
        a_coeffs[i] = item
        i  = 1
    i = 0
    for item in b:
        b_coeffs[i] = item
        i  = 1
    # multiply them together
    c_coeffs = polynomial_multiply(a_coeffs, b_coeffs)
    # now this is where i am lost
    # how to determine with c_coeffs?
    return False
    # return True/False

CodePudding user response:

Thanks to all who helped. I figured it out and hopefully this can help anyone who runs into a similar problem. The issue I had was I incorrectly assigned the coefficients for a_coeffs and b_coeffs.

Here is the solution which passed the tests for those interested.

from numpy.fft import fft, ifft
from numpy import real, imag


def check_sum_exists(a, b, c, n):
    a_coeffs = [0] * n
    b_coeffs = [0] * n
    # convert sets a, b into polynomials as provided in the hint
    # a_coeffs and b_coeffs should contain the result
    for coeff in a:
        a_coeffs[coeff] = 1
    for coeff in b:
        b_coeffs[coeff] = 1
    # multiply them together
    c_coeffs = polynomial_multiply(a_coeffs, b_coeffs)
    # use the result to solve the problem at hand
    for coeff in c:
        if c_coeffs[coeff] >= .5:
            return True
    return False
    # return True/False


def polynomial_multiply(a_coeff_list, b_coeff_list):
    # Return the coefficient list of the multiplication
    # of the two polynomials
    # Returned list must be a list of floating point numbers.
    # Please convert list from complex to reals by using the
    # real function in numpy.
    for i in range(len(a_coeff_list) - 1):
        b_coeff_list.append(0)
    for i in range(len(b_coeff_list) - 1):
        a_coeff_list.append(0)
    a_fft = fft(a_coeff_list)
    b_fft = fft(b_coeff_list)
    c = []
    for i in range(len(a_fft)):
        c.append(a_fft[i] * b_fft[i])
    return real(ifft(c))

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