is decaying fast enough at infinity. ii) The interior problem, i.e. determining $ f $
in the interior of $ K $,
16 KB (2,342 words) - 17:25, 13 June 2020
multiplication) as well as interior (cup-multiplication). This is equivalent to the statement that the mapping
..., "A general algebraic approach to Steenrod operations" , ''The Steenrod Algebra and Its Applications'' , ''Lect. notes in math.'' , '''168''' , Springer (
8 KB (1,093 words) - 08:21, 13 January 2024
...— the [[Stone–Čech compactification|Stone–Čech compactification]] — is the algebra $M ( A )$ of multipliers of $A$, defined by R.C. Busby in 1967 [[#Reference
...{ * }$-algebra of double centralizers of $A$ and the concrete $C ^ { * }$-algebra $M ( A )$. This, in particular, shows that $M ( A )$ is independent of the
17 KB (2,644 words) - 17:46, 1 July 2020
ii) considering the interior $\Theta ( \mu )$ of the convex set of those $\theta \in E ^ { * }$ such tha
...xponential family by the mean. The domain of the means is contained in the interior $C _ { F }$ of the convex hull of the support of $F$. When $C _ { F } = M _
10 KB (1,596 words) - 15:30, 1 July 2020
...nts of the form (2) are given not only at the end points, but also at some interior points of $ a \leq x \leq b $.
...1]</TD> <TD valign="top"> N.S. Bakhvalov, "Numerical methods: analysis, algebra, ordinary differential equations" , MIR (1977) (Translated from Russian)<
7 KB (1,036 words) - 19:36, 5 June 2020
...is denoted by $\beta\omega$. Here, $\mathcal{P}(\omega)$ is the power set algebra of $\omega$ and $\text{fin}$ denotes its ideal of finite sets. The points i
...ality of the continuum]]) in which non-empty $G_\delta$ sets have infinite interior (for short, a Parovichenko space). This theorem had wide applications both
11 KB (1,671 words) - 21:29, 19 November 2017
and the operator of interior multiplication $ i _ {X} $(
...ion" ''Progress in Math.'' , '''6''' (1970) pp. 229–269 ''Itogi. Nauk. Algebra Topol. Geom. 1965'' (1967) pp. 429–465</TD></TR><TR><TD valign="top">[3
9 KB (1,337 words) - 22:16, 5 June 2020
...he foundations of ancient mathematics: elementary geometry, number theory, algebra, the general theory of proportion, and a method for the determination of ar
...ght lines lying in the same plane intersect a third, and if the sum of the interior angles on one side of the latter is less than the sum of two right angles,
9 KB (1,351 words) - 20:43, 26 November 2016
...undamental frequency; it does not reduce torsional rigidity or the maximal interior conformal radius (see [[#References|[3]]]).
...op">[a5]</TD> <TD valign="top"> M. Marcus, "Finite dimensional multilinear algebra" , '''1''' , M. Dekker (1973) pp. 78ff {{MR|0352112}} {{ZBL|0284.15024}} </
8 KB (1,112 words) - 08:24, 6 June 2020
dimensional if and only if it contains interior points with respect to $ E ^ {n} $.
containing interior points (with respect to $ E ^ {n} $).
38 KB (5,928 words) - 19:35, 5 June 2020
...et of all holomorphic vector fields on $\textbf{D}$ is a [[Lie algebra|Lie algebra]] under the commutator bracket
For absolutely convex domains, interior flow invariance conditions can be given in terms of their support functiona
24 KB (3,989 words) - 20:19, 11 January 2021
where $\mathrm{Int}$ denotes the [[interior]].
=Composition algebra=
13 KB (2,146 words) - 19:18, 29 January 2018
is the operation of interior multiplication (contraction), is called the polar system of the integral el
...been generalized to arbitrary differential systems given by ideals in the algebra of differential forms on a manifold (the Cartan–Kähler theorem).
17 KB (2,624 words) - 19:27, 9 January 2024
...manifold with boundary (for example, an operator from the Boutet de Monvel algebra, [[#References|[10]]], [[#References|[11]]]) at a boundary point means inve
is an interior point of $ X $)
12 KB (1,764 words) - 05:06, 24 February 2022
The search for interior points of the spectrum of a sparse matrix $ A $
...processes to compute eigen values of a large sparse matrix (not only "the interior points" ). The interesting aspect is that the computed vectors by no means
19 KB (2,830 words) - 19:42, 27 February 2021
the finite plane) and the interior of the unit disc $ D = \{ {z} : {| z | < 1} \} $ (
in the case of the interior of the unit disc, $ G $
22 KB (3,307 words) - 17:02, 17 December 2019
...e Riemann sphere), the affine straight line $m$ (the finite plane) and the interior of the unit disc $D = \{ z : | z | < 1 \}$ (the Lobachevskii plane). All
...ve group $m$ which is a two-dimensional lattice in $m$; in the case of the interior of the unit disc, $k$ is a subgroup of motions in the Lobachevskii plane wh
21 KB (3,396 words) - 13:36, 17 October 2019
...and, more generally, to the open unit ball $U$ of a so-called $J ^ { * }$-algebra (see [[#References|[a37]]], [[#References|[a25]]] and the references there)
...se, if $F \in \operatorname{Hol} ( {\cal D} )$ is not the identity, has an interior fixed point and is power convergent, then $c$ is unique. However, this is n
20 KB (3,130 words) - 07:34, 8 February 2024
The branch of topology and algebra concerned with braids, the groups formed by their equivalence classes and v
the interior of which contains $ \omega $.
24 KB (3,637 words) - 08:41, 26 March 2023
...al X $ can be transformed by means of an element of $ \Gamma $ into an interior point of $ X $ or into a pseudo-concave point of the boundary $ \parti
...oup with Lie algebra $ \mathfrak g $ . Identify the universal enveloping algebra $ U \mathfrak g $ of $ \mathfrak g $ with the right-invariant differe
17 KB (2,502 words) - 06:16, 12 July 2022