Serlo: EN: Dimension: Unterschied zwischen den Versionen

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In this article we define the dimension of a vector space and show some elementary properties like the dimension formula.

In this article we define the notion of a dimension of a vector space. It would be nice to do it in a way that common vector spaces like ${\displaystyle ℝ,{ℝ}^2,{ℝ}^3,...}$ have the "obvious dimensions" ${\displaystyle 1,2,3,...}$ . The vector space ${\displaystyle {ℝ}^3}$ has a basis with ${\displaystyle 3}$ elements, for example the standard basis ${\displaystyle B_3=\{e_1,e_2,e_3\}}$.

Similarly, for any field ${\displaystyle K}$, we want the vector space ${\displaystyle K^n}$ to have dimension ${\displaystyle {\mathrm{d}\mathrm{i}\mathrm{m}}_K(K^n)=n}$. Again, with the standard basis ${\displaystyle B_n=\{e_1,...,e_n\}}$ we find a basis with exactly ${\displaystyle n}$ vectors.

This suggests to define the dimension of a vector space ${\displaystyle V}$ as the number of vectors of a basis of ${\displaystyle V}$. At this point, it is not yet clear that every basis has the same cardinality. We will prove this in the following.

Mathe für Nicht-Freaks: Vorlage:Definition

From this definition it is not clear that the dimension is independent of the choice of the basis of our vector space. For example, it could happen that a vector space has different bases with different numbers of elements. This does actually never happen, as the next theorem shows:

Mathe für Nicht-Freaks: Vorlage:Satz Mathe für Nicht-Freaks: Vorlage:Beweis

Mathe für Nicht-Freaks: Vorlage:Beispiel

Mathe für Nicht-Freaks: Vorlage:Beispiel

Mathe für Nicht-Freaks: Vorlage:Beispiel

Mathe für Nicht-Freaks: Vorlage:Beispiel

We now prove some properties of the "dimension" notion: Mathe für Nicht-Freaks: Vorlage:Satz

In order to show that it is important to assume ${\displaystyle V}$ to be finite-dimensional, consider an example of an infinite-dimensional vector space that has a proper infinite-dimensional subspace:

Mathe für Nicht-Freaks: Vorlage:Beispiel

The following dimensional formula gives how to calculate the dimension of the sum of two finite dimensional subspaces ${\displaystyle U,W\subseteq V}$ of a ${\displaystyle K}$-vector space ${\displaystyle V}$.

Mathe für Nicht-Freaks: Vorlage:Satz

Next, we consider a conclusion of the dimension formula that makes a statement about the sum of subspaces (missing). Visually, this means that the complement of a subspace in terms of dimension is the missing "remainder".

Mathe für Nicht-Freaks: Vorlage:Satz

Mathe für Nicht-Freaks: Vorlage:Aufgabe

Mathe für Nicht-Freaks: Vorlage:Aufgabe

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