منابع مشابه
Wedgetail Evolution: Soaring to Greater Heights?
Air Operations Division, Systems Sciences Laboratory, Defence Science and Technology Organisation, PO Box 1500, Edinburgh, South Australia, 5111, Australia Electronic Warfare and Radar Division, Systems Sciences Laboratory, Defence Science and Technology Organisation, PO Box 1500, Edinburgh, South Australia, 5111, Australia 12 Intelligence Surveillance and Reconnaissance Division, Information S...
متن کاملGreater nitrogen dioxide concentrations at child versus adult breathing heights close to urban main road kerbside
Nitrogen dioxide (NO2) is a ubiquitous air pollutant with high concentrations particularly close to main roads. The focus of this study was on possible differences in NO2 concentrations between adult and child heights as a function of different distances from heavily trafficked roads in urban areas. Passive diffusion tubes were used to measure NO2 concentrations at heights of 0.8 m (approximate...
متن کاملIntroduction to Heights
Notes for a talk in Stanford’s Arithmetic Dynamics Seminar, Apr. 29, 2014. This talk is an introduction to the theory of heights on projective varieties over local and global fields. I will also say something about canonical heights for a dynamical system, and a local-global formula for these. This material is from Chapters 1-2 of the book by Bombieri and Gubler on heights [BG]; also Silverman’...
متن کاملSeeing big things: overestimation of heights is greater for real objects than for objects in pictures.
In six experiments we demonstrate that the vertical-horizontal illusion that is evoked when viewing photographs and line drawings is relatively small, whereas the magnitude of this illusion when large objects are viewed is at least twice as great. Furthermore, we show that the illusion is due more to vertical overestimation than horizontal underestimation. The lack of a difference in vertical o...
متن کاملExtending Nathanson Heights to Arbitrary Finite Fields
In this paper, we extend the definition of the Nathanson height from points in projective spaces over Fp to points in projective spaces over arbitrary finite fields. If [a0 : . . . : an] ∈ P(Fp), then the Nathanson height is hp([a0 : a1 : . . . : ad]) = min b∈Fp d ∑ i=0 H(bai) where H(ai) = |N(ai)|+p(deg(ai)−1) with N the field norm and |N(ai)| the element of {0, 1, . . . , p− 1} congruent to N...
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ژورنال
عنوان ژورنال: Biomedical Microdevices
سال: 2021
ISSN: 1387-2176,1572-8781
DOI: 10.1007/s10544-021-00549-0