Uniform bounds for norms of theta series and arithmetic applications

Abstract: We prove uniform bounds for the Petersson norm of the cuspidal part of the theta series. This gives an improved asymptotic formula for the number of representations by a quadratic form. As an application, we show that every integer $n \neq 0,4,7 \,(\textrm{mod}\ 8)$ is represented as $n= x_1^2 + x_2^2 + x_3^3$ for integers $x_1,x_2,x_3$ such that the product $x_1x_2x_3$ has at most 72 prime d… Show more

“…where b Q,δ,j (n) is the coefficient of the theta function Θ Q at the corresponding cusp. Trivially bounding det(D) ≤ 2 ℓ ∆ Q for the diagonal form defined before [23,Lemma 11], [23, Lemma 12] implies that…”

Finiteness theorems for universal sums of squares of almost primes

“…where b Q,δ,j (n) is the coefficient of the theta function Θ Q at the corresponding cusp. Trivially bounding det(D) ≤ 2 ℓ ∆ Q for the diagonal form defined before [23,Lemma 11], [23, Lemma 12] implies that…”

Finiteness theorems for universal sums of squares of almost primes

Finiteness theorems for universal sums of squares of almost primes