Kaplansky's theorem on quadratic forms

In mathematics, Kaplansky's theorem on quadratic forms is a result on simultaneous representation of primes by quadratic forms. It was proved in 2003 by Irving Kaplansky.[1]

Statement of the theorem

Kaplansky's theorem states that a prime p congruent to 1 modulo 16 is representable by both or none of x2 + 32y2 and x2 + 64y2, whereas a prime p congruent to 9 modulo 16 is representable by exactly one of these quadratic forms.

This is remarkable since the primes represented by each of these forms individually are not describable by congruence conditions.[2]

Proof

Kaplansky's proof uses the facts that 2 is a 4th power modulo p if and only if p is representable by x2 + 64y2, and that 4 is an 8th power modulo p if and only if p is representable by x2 + 32y2.

Examples

Similar results

Five results similar to Kaplansky's theorem are known:[3]

It is conjectured that there are no other similar results involving definite forms.

Notes

  1. Kaplansky, Irving (2003), "The forms x + 32y2 and x + 64y^2 [sic]", Proceedings of the American Mathematical Society, 131 (7): 2299–2300 (electronic), doi:10.1090/S0002-9939-03-07022-9, MR 1963780.
  2. Cox, David A. (1989), Primes of the form x2 + ny2, New York: John Wiley & Sons, ISBN 0-471-50654-0, MR 1028322.
  3. Brink, David (2009), "Five peculiar theorems on simultaneous representation of primes by quadratic forms", Journal of Number Theory, 129 (2): 464–468, doi:10.1016/j.jnt.2008.04.007, MR 2473893.
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