Exercises
[0F5]We indicate with \({\mathcal P}_{\mathfrak f}({\mathbb {N}})\) the set of subsets \(Bβ {\mathbb {N}}\) which are finite sets. This is said the set of finite parts.
We abbreviate \({\mathcal P}={\mathcal P}_{\mathfrak f}({\mathbb {N}})\) in the following.
Given a sequence \((a_ n)_ n\) of real numbers and a \(Bβ{\mathcal P}\) we indicate with \(s(B)=β_{nβ B} a_ n\) the finite sum with indices in \(B\).
Suppose the series \(β_{n=0}^β a_ n\) converge but not converge at all. Then:
\(\{ s(F ) : F β{\mathcal P}\} \) it is dense in \({\mathbb {R}}\).
There is a reordering \(Ο\) of \({\mathbb {N}}\), that is, a bijective function \(Ο:{\mathbb {N}}β{\mathbb {N}}\), such that all partial sums \(β_{n=0}^ N a_{Ο(n)}\) (at the variation of \(N\)) is dense in \({\mathbb {R}}\).
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