MathDB

a > 0

and

b

c

are integers such that

ac

–

b^2

is a square-free positive integer P. [hide="For example"] P could be

3*5

, but not

3^2*5

. Let

f(n)

be the number of pairs of integers

d, e

such that

ad^2 + 2bde + ce^2= n

. Show that

f(n)

is finite and that

f(n) = f(P^{k}n)

for every positive integer

k

.
Original Statement:
Let

a,b,c

be given integers

a > 0,

ac-b^2 = P = P_1 \cdots P_n

where

P_1 \cdots P_n

are (distinct) prime numbers. Let

M(n)

denote the number of pairs of integers

(x,y)

for which

ax^2 + 2bxy + cy^2 = n.

Prove that

M(n)

is finite and

M(n) = M(P_k \cdot n)

for every integer

k \geq 0.

Note that the "

n

" in

P_N

and the "

n

" in

M(n)

do not have to be the same.

Problem Statement