Vector calculus
An obsolete name for the branch of mathematics
dealing with the properties of operations carried out on vectors (cf.
Vector).
Vector calculus comprises vector algebra and vector analysis. In
vector algebra
linear operations (addition of vectors and multiplication of vectors by
numbers) as well as various vector products (scalar, pseudo-scalar,
vector, mixed, double and triple vector products) are studied. The subject of
vector analysis
are vectors which are functions of one or more scalar arguments.
Vector calculus originated in the
19th century
in connection
with the needs of mechanics and physics, when operations on
vectors began to be performed directly, without
their previous conversion to coordinate form
[1],
[2],
[3].
More advanced studies of the properties of mathematical and
physical objects which are invariant with respect to the
choice of coordinate systems led to a generalization of vector calculus —
tensor calculus.
References| [1] |
C. Wessel,
Arch. for Math. og Naturvid.
, 18
(1896) | | [2] |
W.R. Hamilton,
"Elements of quaternions"
, Chelsea, reprint
(1969) | | [3] |
J.W. Gibbs,
E.B. Wilson,
"Vector analysis"
, Yale Univ. Press
(1913) | | [4] |
N.E. Kochin,
"Vector calculus and fundamentals of tensor calculus"
, Moscow
(1965)
(In Russian) | | [5] |
Ya.S. Dubnov,
"Fundamentals of vector calculus"
, 1–2
, Moscow-Leningrad
(1950–1952)
(In Russian) |
A.B. Ivanov
CommentsReferences| [a1] |
A.P. Wills,
"Vector analysis with an introduction to tensor analysis"
, Dover, reprint
(1958) | | [a2] |
B. Spain,
"Tensor calculus"
, Oliver & Boyd
(1960) |
This text originally appeared in Encyclopaedia of Mathematics
- ISBN 1402006098
|