Sentence examples for ws subjects from inspiring English sources

In contrast, the AC of WS subjects showed markedly enhanced gyrification and increased gray matter volume, regarding averaged landmarks (Fig. 4a), probabilistic maps (Fig. 4b) and individual morphology of HG (Fig. 3, 4c).

Interestingly in this respect is that Martens et al. also found leftward asymmetry (of the planum temporale) in a subgroup of particularly musical WS subjects, which is in accordance with our results [15].

In this context it is of note that the averaged MEG dipoles, which localize the center of primary activation during auditory processing, were shifted towards posterior parts of the AC by 9 mm in the left and 13 mm in the right hemisphere of WS subjects.

To assess WS-region gene transcript levels, we isolated mRNA and performed quantitative RT-PCR on FZD9, BAZ1B, STX1A, CLDN3, CLDN4, RFC2, CLIP2, GTF2IRD1 (exon 2 3), GTF2IRD1 (exon 10 11), and GTF2I for 107 WS subjects (see map of deleted genes in WS in Fig. 1a).

Overall, WS subjects were found to present a generalized significant impairment in verbal and visuo-spatial components either in short- or long-term memory.

According to another school of thought, however, the language abilities of WS subjects might be more normal than those of Downs syndrome individuals, and might look remarkable in contrast to their own marked disabilities in other areas, but nonetheless display a number of abnormal characteristics across a variety of measures when investigated further.

Order: order in which the two tests were performed (b-w: subjects were first tested for color and thereafter for weight, w-b: vice versa) Subjects were presented with two sets of objects.

The optimization problem for the MIMO MOE can be expressed by min w E w H y ⌢ ( i ) 2 ≡ w H R y ⌢ y ⌢ w subject to: w H E 1 = i i T i = 1, 2, ⋯, D (16).

For baseline I, we maximize the weighted sum rate (bit/s/Hz) with respect to W subject to per-BS power constraint, instead of the energy efficiency.

Hence, we write (24) in the following form: min J ( u, w ) subject to  e ( u, w ) = 0. Now, we give Theorem 3.1 on the existence of an optimal solution to the sixth-order convective Cahn-Hilliard equation.

where M = (I-W) T (I-W), subject to two constraints: ∑ i = 1 N y i = 0 and 1 N ∑ i = 1 N y i T y i = I,.