Abuse of notation
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In mathematics, abuse of notation occurs when an author uses a mathematical notation in a way that is not formally correct but that seems likely to simplify the exposition (while being unlikely to introduce errors or cause confusion). Abusing notation should be contrasted with "misusing" notation which should be avoided.
Common examples occur when speaking of compound mathematical objects. For example, a topological space consists of a set T and a topology , and two topological spaces and can be quite different if they have different topologies. Nevertheless, it is common to refer to such a space simply as T when there is no danger of confusion or when it is implicitly clear what topology is being considered. Similarly, one often refers to a group as simply G when the group operation is clear from context.
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[edit] Advantages
The new use may achieve clarity in the new area in an unexpected way.
[edit] Disadvantages
The new use may borrow arguments from the old area that do not carry over, creating a false analogy.
[edit] Examples
- John Harrison cites "the use of f(x) to represent both application of a function f to an argument x, and the image under f of a subset, x, of f's domain".
- The computation of the vector product as the determinant of the matrix
is a significant abuse of notation as are treated as scalars but are in fact vectors.
[edit] Quotation
- "We will occasionally use this arrow notation unless there is no danger of confusion."
(Ronald L. Graham, Rudiments of Ramsey Theory)
[edit] See also
[edit] External links
- Section 2.2: Criticism and reconstruction from "Formalized Mathematics", by John Harrison
- "Strong Symbols", by Henning Thielemann (PDF Slides) Section 5: Common abuse of notation