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Disentangling host genetic variation for avoidance and resistance to pathogens. [PDF]
BMC BiolAmoroso CR, Antonovics J.
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Data-driven emulation of modal aerosol microphysics via neural operator-based modeling. [PDF]
Sci RepBai Z, Rouson D.
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Nonclassical correlations in binary Bose-Einstein condensates: from double-well confinement to twin Schrödinger cat states. [PDF]
Sci RepJogania J, Nath A, Bera J.
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Stability Analysis of Nonlinear Neutral Functional Differential Equations
SIAM Journal on Control and Optimization, 2017Employing a system transformation, the comparison principle and the spectral properties of Metzler matrices, the authors derive some new explicit criteria for the exponential stability of general nonlinear neutral functional differential equations. The results so obtained are both delay-dependent and delay-independent criteria.
Ngoc, Pham Huu Anh, Trinh, Hieu
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Perturbed Impulsive Neutral Stochastic Functional Differential Equations
Qualitative Theory of Dynamical Systems, 2021zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Cheng, Lijuan, Hu, Lanying, Ren, Yong
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Neutral fuzzy fractional functional differential equations
Fuzzy Sets and Systems, 2021zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Phu, Nguyen Dinh +2 more
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Neutral Mixed Type Functional Differential Equations
Journal of Dynamics and Differential Equations, 2015The authors consider implicitly defined equations of mixed type which arose from examining electrical signaling in cardiac tissue and nerve conduction models. They are studying travelling wave solutions \((\phi,c)\) with \(\phi\) waveform and wave speed \(c\) which satisfy the following equation: \[ \sum\limits^N_{j=1}B_j(\xi)\left[-c\phi'(\xi+r_j)+f ...
Lamb, Charles, Van Vleck, Erik S.
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Spline Approximations for Neutral Functional Differential Equations
SIAM Journal on Numerical Analysis, 1981Based on an abstract approximation theorem for ${\text{C}}_0 $-semigroups (Trotter–Kato theorem) we present an algorithm where linear autonomous functional-differential equations of neutral type are approximated by sequences of ordinary differential equations of increasing dimensions.
Kappel, F., Kunisch, K.
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PERIODIC SOLUTIONS OF NEUTRAL FUNCTIONAL DIFFERENTIAL EQUATIONS
Acta Mathematica Scientia, 2001The problem of periodic solutions for nonlinear neutral functional-differential equations \[ \frac{d}{dt}D(t, x_t)=f(t,x_t) \] is discussed by using coincidence degree theory. A new result on the existence of periodic solutions is obtained.
Peng, Shiguo, Zhu, Siming
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