- δ may
depend on ε and ƒ. For
pointwise equicontinuity, δ may
depend on ε and x0. For
uniform equicontinuity, δ may
depend only on ε. More generally,...
-
interval has a
uniformly convergent subsequence. The main
condition is the
equicontinuity of the
family of functions. The
theorem is the
basis of many proofs...
-
Stochastic Equicontinuity". Econometrica. 59 (4): 1161–1167. doi:10.2307/2938179. JSTOR 2938179. Pollard,
David (1984). "Stochastic
Equicontinuity". Convergence...
-
operator K on
function spaces; the
compactness property is
shown by
equicontinuity. The
method of
approximation by finite-rank
operators is
basic in the...
-
extremum estimator), then a more
complicated argument involving stochastic equicontinuity has to be used. An
estimator can be
unbiased but not consistent. For...
- In mathematics,
especially functional analysis, a
bornology B{\displaystyle {\mathcal {B}}} on a
vector space X{\displaystyle X} over a
field K,{\displaystyle...
- discontinue, discontinuity, discontinuous, entertain, entertainment,
equicontinuity, equicontinuous, impertinence, impertinent, incontinence, incontinent...
- In mathematics, a
linear form (also
known as a
linear functional, a one-form, or a covector) is a
linear map from a
vector space to its
field of scalars...
- {\displaystyle B} ). However, it has been
shown that
equitightness and
equicontinuity imply this property. For a
subset B {\displaystyle B} of L p ( Ω ) {\displaystyle...
-
kernel K
yields a
compact operator.
Compactness may be
shown by
invoking equicontinuity. As an operator, it has a
spectral theory that can be
understood in...
