Sentence examples for a vector measuring from inspiring English sources

Our first regression model is (12) where L it is a measure of hospital delayed discharges for patients resident in LA i in year t, s it is a vector measuring supply of care homes in LA i in year t (total beds and average bed prices) and x it is a vector of control variables, such as the elderly population.

In the original motif space, the vector representation of the peak sequences has a meaning and each component of a vector measures how similar a motif is to a peak sequence.

In particular, this domain can be represented as the space of integrable functions with respect to a vector measure defined on a δ-ring.

Consider a vector measure of bounded variation m with values in a Banach space and an operator T:X⟶L1(m), where L1(m) is the space of integrable functions with respect to m.

A Banach space X is said to have the SVM (stability of vector measures) property if there exists a constant v<∞ such that for any algebra of sets F, and any function ν:F→X satisfying∥ν(A∪B)−ν(A)−ν(B ∥⩽1for disjointA,B∈F, there is a vector measure μ:F→X with ∥ν(A)−μ(A)∥⩽v for all A∈F.

If m is a vector measure defined on (mathfrak{A}), then the integral will be defined in the same manner.

Let m be a vector measure from (mathfrak{A}) to E. We say that m is a bounded additive vector measure if its verifies similar conditions of bounded additive set-valued measures.

Then there exists a vector measure ν on a δ-ring and with values in F a such that F and L w p are order isometric.

Representation of Banach lattices as spaces of integrable functions with respect to a vector measure is nowadays a well-known useful technique.

In [17], Kufner and Opic define the following sets: Let us consider (1le p < infty ) and a vector measure (mu = (mu _0, ldots, mu _k)).

Since the space is order continuous, Theorem 10 in [21] gives the existence of a vector measure on a δ-ring ν : R → ℓ q p such that ℓ q is order isomorphic to L p.