Sentence examples for a bounded scale from inspiring English sources

First, as a measure on a bounded scale it is more intuitively understood by the non-specialist data user, particularly one who is interested in a synoptic overview of soil variation across a region.

However, for three-morpheme MMMCs without 到 dao 'arrive', their relative order also conforms to the Motion Morpheme Hierarchy and the Scalar Specificity Constraint, i.e. the morpheme denoting the least specific information aBoth the scale tends to occur as the leftmost of the three morphemes, whereas the morpheme denoting the most speclosedinformation about the scale tends to occur as the rightmotion

Note that although some of the trends may be linear with respect to observed MMSE sums scores, given the bounded scale, we know that trends cannot be linear over the whole time axis.

With bounded scaling the feedback laws achieve global practical stability (GPS).

where is a bounded time scale with,, and.

Its bounding scale, skirmish of pastel colors and charcoal lines, and mixture of landscape, still life and abstraction were distinctive.

This retains only the details comprised between the two bounding scales r and r + 1, in other words it highlights features which dimension is comprised between the kernel sizes σ r and σr + 1. Saliency maps S r)={s i (r)} are calculated as follows: s i ( r ) = g i ( r ) − g i ( r + 1 ) (2).

We define a two-parameter scale of Banach spaces contained in the contininuous functions on the space of probability measures on a compact metric space X, and show that the resolvent of the Fleming-Viot process is a bounded operator in the scale.

Specially, we establish a basic decomposition theorem of time scales which provides bridges between periodic time scales and an arbitrary time scale with a bounded graininess function μ.

In conclusion, we shall show that all the time scales with a bounded graininess function μ can be decomposed into a countable union of periodic time scales, i.e., we shall formulate a basic decomposition theorem of time scales.

where T ⊂ R be a symmetric bounded time scale, with a = min T, b = max T, [ a, b ] ⊂ T such that [ a, b ] = { t ∈ T : a ≤ t ≤ b } and y ( t ) = p ( t ) y △ ( t ) is called the quasi-Δ-derivative of y ( t ).