Nabla symbol

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For other uses, see nabla.

The harp, the instrument after which the nabla symbol is named

Nabla is a symbol, shown as $\nabla$ . The name comes from the Greek word for a Hebrew harp with a similar shape. Related words also exist in Aramaic and Hebrew. The symbol was first used by William Rowan Hamilton in the form of a sideways wedge: ⊳ ^[1]. Another, less-common name for the symbol is atled (delta spelled backwards) because the nabla is an inverted delta. ^[1]

The nabla symbol is available in standard HTML as ∇ and in LaTeX as \nabla. In Unicode, it is the character at decimal number 8711, or the hexadecimal number 0x2207.

1 Use in mathematics
2 See also
3 Footnotes
4 External links

[edit] Use in mathematics

Nabla is used in mathematics to denote the del operator. It also can refer to a connection in differential geometry, as well as the all relation (most commonly in lattice theory). It was introduced by the Irish mathematician and physicist William Rowan Hamilton in 1837 ^[2]. W. Thomson wrote in 1884:

"I took the liberty of asking Professor Bell whether he had a name for this symbol ∇ and he has mentioned to me nabla, a humorous suggestion of Maxwell's. It is the name of an Egyptian harp, which was of that shape" ^[3]

In 1901 Gibbs & Wilson wrote:

"This symbolic operator ∇ was introduced by Sir W. R. Hamilton and is now in universal employment. There seems, however, to be no universally recognized name for it, although owing to the frequent occurrence of the symbol some name is a practical necessity. It has been found by experience that the monosyllable del is so short and easy to pronounce that even in complicated formulae in which ∇ occurs a number of times no inconvenience to the speaker or hearer arises from the repetition. ∇V is read simply as 'del V' "^[4]

[edit] See also

Nabla in cylindrical and spherical coordinates
Del, the vector differential operator

[edit] Footnotes

^ ^a ^b "The Nabla of Sir William Rowan Hamilton" (See their footnote 4)
^ W. R. Hamilton, in Trans. R. Irish Acad. XVII. 236 (1837)
^ W. Thomson, Notes Lect. Molecular Dynamics & Wave Theory of Light at Johns Hopkins Univ. x 112 (MS) (1884)
^ Gibbs & Wilson, Vector analysis: a text-book for the use of students of mathematics and physics, founded upon the lectures of J. Willard Gibbs by Edwin Bidwell Wilson (1901)