-
applied “
orthogonally” in
order to
maximize the
expressive power of the
language while trying to
avoid deleterious superfluities.
Orthogonality is a system...
- mathematics, an
orthogonal polynomial sequence is a
family of
polynomials such that any two
different polynomials in the
sequence are
orthogonal to each other...
- In mathematics,
orthogonal functions belong to a
function space that is a
vector space equipped with a
bilinear form. When the
function space has an interval...
- In geometry, two
circles are said to be
orthogonal if
their respective tangent lines at the
points of
intersection are
perpendicular (meet at a
right angle)...
- and to implement. On the
other hand,
these concepts have been
applied "
orthogonally" in
order to
maximize the
expressive power of the
language while trying...
- In
linear algebra, an
orthogonal matrix, or
orthonormal matrix, is a real
square matrix whose columns and rows are
orthonormal vectors. One way to express...
- In mathematics, an
orthogonal array (more specifically, a fixed-level
orthogonal array) is a "table" (array)
whose entries come from a
fixed finite set...
-
families of
orthogonal functions are used to form an
orthogonal basis. The
concept has been used in the
context of
orthogonal functions,
orthogonal polynomials...
- an
orthogonally convex set is not
necessarily connected. The
orthogonal convex hull of a set K ⊂ Rd is the
intersection of all
connected orthogonally convex...
- the
orthogonal complement of a
subspace W of a
vector space V
equipped with a
bilinear form B is the set W⊥ of all
vectors in V that are
orthogonal to...
