- In geometry, a half-space is
either of the two
parts into
which a
plane divides the three-dimensional
Euclidean space. If the
space is two-dimensional...
-
distinct halfplane, with all
halfplanes having that line as
their common boundary. An
embedding like this in
which the
edges are
drawn on
halfplanes is called...
- the
power of P. In the case n = 2, the
power diagram consists of two
halfplanes,
separated by a line
called the
radical axis or
chordale of the two circles...
- of the ring lemma,
showing that it is tight. The
construction allows halfplanes to be
considered as
degenerate circles with
infinite radius, and includes...
-
number and
defines the shift. The pair (a, b)
defines a
point in the
right halfplane R+ × R. The
projection of a
function x onto the
subspace of
scale a then...
- plane, with a
single pole of
order 1 at z = 1. Its
zeros in the left
halfplane are all the
negative even integers, and the
Riemann hypothesis is the...
- of the
weights of the two
unidentified halfplanes of that
neighborhood is the
weight of the
identified halfplane.
Branched covering Branched manifold Li...
- of L2
boundary values of
holomorphic functions on the
upper and
lower halfplanes. H 2 ( R ) {\displaystyle H^{2}(\mathbb {R} )} and its
conjugate consist...
- of
polygons and
polyhedra which can be
obtained from a
finite set of
halfplanes (halfspaces) by
Boolean operations of set
intersection and set complement...
- {1-x^{2}-y^{2}}{x^{2}+(1-y)^{2}}}\right)\,} in the
halfplane model. A
point (x,y) in the
halfplane model maps to ( 2 x x 2 + ( 1 + y ) 2 , x 2 + y...
