Kronecker's lemma

The Kronecker lemma deals with limits in mathematics. It is named after the German mathematician Leopold Kronecker .

lemma

Be a sequence of real numbers. ${\ displaystyle (a_ {k}) _ {k \ in \ mathbb {N}}}$

Let be a monotonic, unbounded sequence of positive real numbers. ${\ displaystyle (b_ {k}) _ {k \ in \ mathbb {N}}}$

If converges, it follows . ${\ displaystyle \ sum _ {k = 1} ^ {n} {\ frac {a_ {k}} {b_ {k}}}}$ ${\ displaystyle {\ frac {1} {b_ {n}}} \ sum _ {k = 1} ^ {n} a_ {k} \ to 0}$

Inference

The above lemma simplifies to the following statement when setting for all : ${\ displaystyle b_ {k} = k}$ ${\ displaystyle k \ in \ mathbb {N}}$

Be a sequence of real numbers. ${\ displaystyle (a_ {k}) _ {k \ in \ mathbb {N}}}$

If converges, it follows . ${\ displaystyle \ sum _ {k = 1} ^ {n} {\ frac {a_ {k}} {k}}}$ ${\ displaystyle {\ frac {1} {n}} \ sum _ {k = 1} ^ {n} a_ {k} \ to 0}$

application

Kronecker's lemma can be used to prove the strong law of large numbers .

literature

Albrecht Irle : Probability Theory and Statistics: Basics - Results - Applications . 2nd Edition. Vieweg + Teubner, 2005, ISBN 978-3-519-12395-8 . Pages 190 and 194
Acta Mathematica Hungarica, Volume 44, Numbers 1-2, March 1984, pages 143 and 144