Advanced book on Mathematics Olympiad

144 3 Real Analysis

Solution.A bounded convex function on( 0 ,∞)has a horizontal asymptote, so its deriva-
tive tends to zero at infinity. Our problem is the discrete version of this result. The first
derivative of the sequence isbn=an+ 1 −an,n≥1. The convexity condition can be
written asan+ 1 −an≥an−an− 1 , which shows that(bn)nis increasing. Since(an)nis
bounded,(bn)nis bounded too, and being monotonic, by the Weierstrass theorem it con-
verges at a finite limitL.IfL>0, thenbneventually becomes positive, soanbecomes
increasing because it has a positive derivative. Again by the Weierstrass theorem,an
converges to some limitl, and thenL=l−l=0, a contradiction. A similar argument
rules out the caseL<0. We are left with the only possibilityL=0. 

And now some problems.

425.Letx 1 ,x 2 ,...,xnbe real numbers. Find the real numbersathat minimize the
expression
|a−x 1 |+|a−x 2 |+···+|a−xn|.

426.Leta, b >0 andx, c >1. Prove that

xa

c

+xb

c

≥ 2 x(ab)

c/ 2

.

427.A triangle has side lengthsa ≥ b ≥cand vertices of measuresA, B,andC,
respectively. Prove that
Ab+Bc+Ca≥Ac+Ba+Cb.

428.Show that if a functionf:[a, b]→Ris convex, then it is continuous on(a, b).

429.Prove that a continuous function defined on a convex domain (for example, on an
interval of the real axis) is convex if and only if

f

(

x+y

2

)

≤

f(x)+f(y)

2

, for allx, y∈D.

430.Call a real-valued functionvery convexif

f(x)+f(y)

2

≥f

(

x+y

2

)

+|x−y|

holds for all real numbersxandy. Prove that no very convex function exists.

431.Letf:[a, b]→Rbe a convex function. Prove that

f(x)+f(y)+f(z)+ 3 f

(

x+y+z

3

)

≥ 2

[

f

(

x+y

2

)

+f

(

y+z

2

)

+f

(

z+x

2

)]

,

for allx, y, z∈[a, b].