排序方式: 共有12条查询结果,搜索用时 15 毫秒
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Elena Laukhina Vladislava Tkacheva Salavat Khasanov Leokadia Zorina Jordi Gómez-Segura Angel Pérez del Pino Jaume Veciana Vladimir Laukhin Concepció Rovira 《Chemphyschem》2006,7(4):920-923
Temperature has great impact on the structure and size of the linked crystallites of the conducting topmost layer formed at the surface of a polycarbonate film via the reaction BEDT-TTF+IBr [BEDT-TTF=bis(ethylenedithio)tetrathiafulvalene]. We show that fine temperature control permits formation of a semiconducting topmost layer of alpha'-(BEDT-TTF)(2)(I(x)Br(1-x))(3) crystallites with either micro- or nanometre size, a result that opens a route to miniaturized conducting plastic materials. 相似文献
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We prove that a compact subset of the complex plane satisfies a local Markov inequality if and only if it satisfies a Kolmogorov type inequality. This result generalizes a theorem established by Bos and Milman in the real case. We also show that every set satisfying the local Markov inequality is a sum of Cantor type sets which are regular in the sense of the potential theory. 相似文献
4.
Armelles G Cebollada A García-Martín A Montero-Moreno JM Waleczek M Nielsch K 《Langmuir : the ACS journal of surfaces and colloids》2012,28(24):9127-9130
The magneto-optical properties of Au-Co(x)Fe(3?-?x)O(4) core-shell nanowires embedded in porous alumina membranes are studied. The structures were obtained by depositing Co(x)Fe(3?-?x)O(4) on the pore walls of alumina membranes by atomic layer deposition and filling the resulting nanotube with gold by electrodeposition. The effect of plasmon resonance excitation on the magneto-optical activity is clearly observed as a modification of the spectral line shape of the Kerr rotation signal. 相似文献
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We study pseudo Leja sequences attached to a compact set in the complex plane. The requirements are weaker than those of ordinary Leja sequences, but these sequences still provide excellent points for interpolation of analytic functions and their computation is much easier. We also apply them to the construction of excellent sets of nodes for multivariate interpolation of analytic functions on product sets. 相似文献
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Let E be a compact subset of C. We prove that if E satisfies the following local Markov property: for each polynomial P,
where M, m, s are positive constants independent of P,
and
; then E is L-regular, i.e. regular in the sense of the potential theory. In particular, if
satisfies the global Markov inequality, then E is L-regular. We also prove that if
is an m-perfect set (there exists c > 0 such that, for all
and $r\in (0,1]$,
and
, then E is L-regular. Examples given by Siciak [20] show that the assumption that m < 2 cannot be omitted. 相似文献
7.
Magnon contribution to the magnetoresistance of iron nanowires deposited using pulsed electrodeposition 下载免费PDF全文
Philip Sergelius Josep M. Montero Moreno Martin Waleczek Tim Böhnert Detlef Görlitz Kornelius Nielsch 《固体物理学:研究快报》2015,9(4):255-258
Iron nanowires with a square cross section are grown by pulsed electrodeposition within a newly developed nanochannel template that allows for easy characterization. Measurements of the magnetoresistance as a function of magnetic field and temperature are performed within a large parameter window allowing for the investigation of the magnonic contribution to the magnetoresistance of electrodeposited iron nanowires. Values for the temperature dependent magnon stiffness D (T) are extracted: D (T) = D0(1 – d1T2) = 365(1 – 4.4 × 10–6 · T2 · K–2) meV Å2.
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Let E be a compact set preserving the Markov inequality and m(E) be its best exponent i.e., m(E) is the infimum of all possible exponents in this inequality on E. It is known that $\alpha (E) \le \frac1{m(E)}$ where α(E) is the best exponent in Hölder continuity property of the (pluri)complex Green function (with pole at infinity) of E. We show that if E???? N (or ? N ) with N?≥?2 then the Markov inequality need not be fulfilled with m(E). We also construct a set E????2 such that the Markov inequality holds at the tip of exponential cusps composing E but for the whole set E we have m(E)?=?∞. Moreover, we prove that sup m(E)?=?∞ where the supremum is taken over all compact sets E???? preserving the Markov inequality. Finally, we prove that if E is a Markov set in ? then its image F(E) under a holomorphic mapping F is a Markov set too. More precisely, we prove that $m(F(E))\leq m(E)\cdot \Big(1+ \max\limits_{ \partial E\cap\{F'(t)=0\}}\textrm{ord}_t F'\Big)$ . 相似文献
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A compact set
K ì \mathbbCN{K \subset \mathbb{C}}^{N} satisfies (ŁS) if it is polynomially convex and there exist constants B,β > 0 such that
VK(z) 3 B(dist(z,K))b if dist(z,K) £ 1, \labelLS V_K(z)\geq B(\rm{dist}(z,K))^\beta\qquad \rm{ if}\quad \rm{ dist}(z,K)\leq 1, \label{LS} 相似文献
10.
We deduce a polynomial estimate on a compact planar set from a polynomial estimate on its circular projection, which enables
us to prove Markov and Bernstein-Walsh type inequalities for certain sets. We construct
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