In number theory and harmonic analysis, the Landsberg–Schaar relation (or identity) is the following equation, which is valid for arbitrary positive integers p and q:
The standard way to prove it[1] is to put τ = 2iq/p + ε, where ε > 0 in this identity due to Jacobi (which is essentially just a special case of the Poisson summation formula in classical harmonic analysis):
and then let ε → 0.
A proof using only finite methods was discovered in 2018 by Ben Moore.[2][3]
If we let q = 1, the identity reduces to a formula for the quadratic Gauss sum modulo p.
The Landsberg–Schaar identity can be rephrased more symmetrically as
provided that we add the hypothesis that pq is an even number.
References
edit- ^ Dym, H.; McKean, H. P. (1972). Fourier Series and Integrals. Academic Press. ISBN 978-0122264511.
- ^ Moore, Ben (2020-12-01). "A proof of the Landsberg–Schaar relation by finite methods". The Ramanujan Journal. 53 (3): 653–665. arXiv:1810.06172. doi:10.1007/s11139-019-00195-4. ISSN 1572-9303. S2CID 55876453.
- ^ Moore, Ben (2019-07-17). "A proof of the Landsberg-Schaar relation by finite methods". arXiv:1810.06172 [math.NT].