Precise asymptotics with log-periodic term in an elementary optimization problem

Abstract

The function ∈fn nx1/n has the asymptotics eu+e d2(u)/(2u)+O(1/u2) as x∞, where u= x and d(u) is the distance from u to the nearest integer. We generalize this observation. First, the curves y=nx1/n can be written parametrically as x=nt, y=nt. In general, let (un(t),vn(t)) be a family of parametric curves with asymptotics un=n p1(t)+q1(t)+r1(t)/n+O(1/n2) and vn=n p2(t)+q2(t)+r2(t)/n+O(1/n2). Suppose the function p1(t)/p0(t) has a unique nondegenerate minimum in the parameter domain. It is shown that the asymptotics of their lower envelope v(u)=∈fn,t vn(t), where u=un(t), has the asymptotics of the form v(u)=a0 u+a1+(u)/u+O(1/u2), where is an affinely transformed function d2(·). Second, note that nx1/n is the minimum of the sum t1+t2/t1+…+tn/tn-1 subject to the constraint tn=x. We consider a similar asymptotic problem for the sums t1+t2/(t1+1)+…+tn/(tn-1+1). Let Fn(x) is the minimum value of the n-term sum under the constraint tn=x. Define F(x)=∈fn Fn(x). We show that F(x)=eu-A+e d2(u+b)/(2u)+O(1/u2) with certain numerical constants A and b. We present alternative forms of this optimization problem, in particular, a ``least action'' formulation. Also we find the asymptotics Fn(p)(x)=e n-A(p)+O(1/ n) for the function arising from the sums with denominators of the form tj+p with arbitrary p>0 and establish some facts about the function A(p).