Uniform bounds for norms of theta series and arithmetic applications

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 not equal 0, 4, 7 (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(1)x(2)x(3) has at most 72 prime divisors.