Results 171 to 180 of about 2,327 (208)

Thermomechanical properties of bat and human red blood cells-Implications for hibernation. [PDF]

Proc Natl Acad Sci U S A
Fregin B, Hossain MF, Biedenweg D, Friedrichs V, Balkema-Buschmann A, Bokelmann M, Lehnert K, Mokbel D, Aland S, Scholz CC, Lehmann P, Otto O, Kerth G.   +12 more
europepmc   +1 more source

A novel, FFT-based one-dimensional blood flow solution method for arterial network. [PDF]

Biomech Model Mechanobiol, 2019
Sazonov I, Nithiarasu P.
europepmc   +1 more source

Inverse design in photonic crystals. [PDF]

Nanophotonics
Deng R, Liu W, Shi L.
europepmc   +1 more source

Free Final Time Input Design Problem for Robust Entropy-Like System Parameter Estimation. [PDF]

Entropy (Basel), 2018
Jakowluk W.
europepmc   +1 more source

Distributed intelligence in industrial and automotive cyber-physical systems: a review. [PDF]

Front Robot AI
Piperigkos N, Gkillas A, Arvanitis G, Nousias S, Lalos A, Fournaris A, Radoglou-Grammatikis P, Sarigiannidis P, Moustakas K.   +8 more
europepmc   +1 more source

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On Harmonic Close-To-Convex Functions

Computational Methods and Function Theory, 2012
zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Ponnusamy, Saminathan, Kaliraj, Anbareeswaran Sairam   +1 more
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p-Harmonic Maps and Convex Functions

Geometriae Dedicata, 1999
The following theorem is proved. Let \(M\) be a complete noncompact Riemannian manifold, \(N\) a simply connected Riemannian manifold of nonpositive curvature, and \(\varphi:M\to N\) a \(C^1\) \(p\)-harmonic map. Then \(\varphi\) is constant, provided that \(\int_M\|d\varphi \|^{p-1}< \infty\).
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Completely Convex and Positive Harmonic Functions

SIAM Journal on Mathematical Analysis, 1975
A completely convex function is a positive real-valued function on a real interval whose even derivatives alternate in sign. The author shows that every completely convex function is the restriction to the real line of a positive harmonic function in a vertical strip which is completely convex in x for each y.
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Convolution Properties of Convex Harmonic Functions

International Journal of Open Problems in Complex Analysis, 2012
In this paper, we examine the convolutions of convex harmonic functions with some other classes of univalent harmonic functions dened by certain coecient conditions and prove that such convolutions belong to some well known classes of univalent harmonic functions.
Raj Kumar, Sushma Gupta, Sukhjit Singh
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Convex subclass of harmonic starlike functions

Applied Mathematics and Computation, 2004
A complex valued harmonic function \(f\) defined in a simply connected domain \(\Omega\) can be represented as \(f = h + \overline{g}\), where \(h\) and \(g\) are holomorphic in \(\Omega\). Such an \(f\) is locally univalent and sense preserving in \(\Omega \) if and only if \(|h'(z)| > |g'(z)|\) in \(\Omega\).
Yalcin, Sibel, Yamankaradeniz, M, Ozturk, M   +2 more
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