The DICT Development Group
4 definitions found
From The Collaborative International Dictionary of English v.0.48 :
Dual \Du"al\, a. [L. dualis, fr. duo two. See Two.]
Expressing, or consisting of, the number two; belonging to
two; as, the dual number of nouns, etc., in Greek.
Here you have one half of our dual truth. --Tyndall.
From WordNet (r) 3.0 (2006) :
adj 1: consisting of or involving two parts or components
usually in pairs; "an egg with a double yolk"; "a double
(binary) star"; "double doors"; "dual controls for pilot
and copilot"; "duple (or double) time consists of two (or
a multiple of two) beats to a measure" [syn: double,
2: having more than one decidedly dissimilar aspects or
qualities; "a double (or dual) role for an actor"; "the
office of a clergyman is twofold; public preaching and
private influence"- R.W.Emerson; "every episode has its
double and treble meaning"-Frederick Harrison [syn: double,
dual, twofold, two-fold, treble, threefold, three-
3: a grammatical number category referring to two items or units
as opposed to one item (singular) or more than two items
(plural); "ancient Greek had the dual form but it has merged
with the plural form in modern Greek"
From Moby Thesaurus II by Grady Ward, 1.0 :
43 Moby Thesaurus words for "dual":
Janus-like, ambidextrous, bifacial, bifold, biform, bifurcated,
bilateral, binary, binate, biparous, bipartisan, bipartite,
bivalent, conduplicate, dichotomous, disomatous, double,
double-barreled, double-faced, duadic, dualistic, duple, duplex,
duplicate, duplicated, dyadic, geminate, geminated, identical,
matched, paired, second, secondary, twain, twin, twinned, two,
two-faced, two-level, two-ply, two-sided, two-story, twofold
From The Free On-line Dictionary of Computing (18 March 2015) :
Every field of mathematics has a different
meaning of dual. Loosely, where there is some binary symmetry
of a theory, the image of what you look at normally under this
symmetry is referred to as the dual of your normal things.
In linear algebra for example, for any vector space V, over
a field, F, the vector space of linear maps from V to F is
known as the dual of V. It can be shown that if V is
finite-dimensional, V and its dual are isomorphic (though no
isomorphism between them is any more natural than any other).
There is a natural embedding of any vector space in the dual
of its dual:
V -> V'': v -> (V': w -> wv : F)
(x' is normally written as x with a horizontal bar above it).
I.e. v'' is the linear map, from V' to F, which maps any w to
the scalar obtained by applying w to v. In short, this
double-dual mapping simply exchanges the roles of function and
It is conventional, when talking about vectors in V, to refer
to the members of V' as covectors.
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