MathDB

4

Part of 2013 Putnam

Problems(2)

Putnam 2013 A4

Source:

12/9/2013
A finite collection of digits 00 and 11 is written around a circle. An arc of length L0L\ge 0 consists of LL consecutive digits around the circle. For each arc w,w, let Z(w)Z(w) and N(w)N(w) denote the number of 00's in ww and the number of 11's in w,w, respectively. Assume that Z(w)Z(w)1|Z(w)-Z(w')|\le 1 for any two arcs w,ww,w' of the same length. Suppose that some arcs w1,,wkw_1,\dots,w_k have the property that Z=1kj=1kZ(wj) and N=1kj=1kN(wj)Z=\frac1k\sum_{j=1}^kZ(w_j)\text{ and }N=\frac1k\sum_{j=1}^k N(w_j) are both integers. Prove that there exists an arc ww with Z(w)=ZZ(w)=Z and N(w)=N.N(w)=N.
Putnampigeonhole principlefloor functionceiling functioncombinatorial geometrycollege contests
Putnam 2013 B4

Source:

12/9/2013
For any continuous real-valued function ff defined on the interval [0,1],[0,1], let μ(f)=01f(x)dx,Var(f)=01(f(x)μ(f))2dx,M(f)=max0x1f(x).\mu(f)=\int_0^1f(x)\,dx,\text{Var}(f)=\int_0^1(f(x)-\mu(f))^2\,dx, M(f)=\max_{0\le x\le 1}|f(x)|. Show that if ff and gg are continuous real-valued functions defined on the interval [0,1],[0,1], then Var(fg)2Var(f)M(g)2+2Var(g)M(f)2.\text{Var}(fg)\le 2\text{Var}(f)M(g)^2+2\text{Var}(g)M(f)^2.
Putnamfunctionintegrationinequalitiescalculuscollege contests