Results 211 to 220 of about 209,790 (271)
The Young's Modulus as a Mechanical Biomarker in AFM Experiments: A Tool for Cancer Diagnosis and Treatment Monitoring. [PDF]
Sensors (Basel)Kontomaris SV, Malamou A, Stylianou A.
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An explicit integration approach for predicting the microstructures of multicomponent alloys. [PDF]
Nat CommunMorino T, Ode M, Hirosawa S.
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A single-seed uniform distribution and spreading device for real-time detection of <i>Ambrosia artemisiifolia</i> and <i>Ambrosia trifida</i> seeds in imported soybeans. [PDF]
Front Plant SciLiu Z +6 more
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Interferometric Deflection Analysis of Suspended 2D Polyaramid Thin Films. [PDF]
Small MethodsQuien M +6 more
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Chirality-driven all-optical image differentiation. [PDF]
NanophotonicsKoufidis SF +4 more
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Geometry-controlled engineering of the low-temperature proximity effect in normal metal-superconductor junctions. [PDF]
Beilstein J NanotechnolTomayeva MA +4 more
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2003
Abstract As we have already mentioned, and as this chapter emphasises, parabolic equations probably occur more commonly than any other type of partial differential equation in applied science. However, that is not the only reason why this chapter is one of the longest of the book.
John Ockendon +3 more
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Abstract As we have already mentioned, and as this chapter emphasises, parabolic equations probably occur more commonly than any other type of partial differential equation in applied science. However, that is not the only reason why this chapter is one of the longest of the book.
John Ockendon +3 more
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The parabolic bellman equation
Nonlinear Analysis: Theory, Methods & Applications, 1981where Q E Q x (0, T) for some smooth bounded domain Sz c [w”, apQ denotes the parabolic boundary of Q, and each L! is a second order, uniformly elliptic operator of the form Lku = -afj(x, t)uxixj + b;(x, t)u_ + ek(x, r)u (1 Oandall(x,t)EQ,~~IW”: ck > 0 (1 < k < m): and also (1.3)
Evans, Lawrence C., Lenhart, Suzanne
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Nonlinear Degenerate Parabolic Equations
Acta Mathematica Hungarica, 1997The author proves the existence of weak solutions of the nonlinear degenerate parabolic initial-boundary value problem \[ {{\partial u}\over{\partial t}} - \sum_{i=1}^N D_iA_i(x,t,u,Du) + A_0(x,t,u,Du) = f(x,t)\quad\text{ in }\Omega\times(0,T), \] \[ u(x,0) = u_0(x)\quad \hbox{ in }\Omega, \] in the space \(L^p(0,T,W^{1,p}_0(v,\Omega))\), where ...
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