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Identification of "Spinal Enlargements" Correlating with Paired and Unpaired Fins in Zebrafish.
Brain Behav EvolTakaoka R, Hagio H, Yamamoto N.
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Maxwell–Stokes system with Robin boundary condition
Calculus of Variations and Partial Differential Equations, 2023zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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The third boundary condition—was it robin’s?
The Mathematical Intelligencer, 1998A real-valued function \(u\) of \(n\) real variables is called harmonic in an \(n\)-dimensional domain if it satisfies Laplace's equation \(\nabla u=0\), where \(\nabla\) is the \(n\)-dimensional Laplace operator. Certain boundary conditions to be satisfied by \(u\) are familiar in the literature.
Gustafson, Karl, Abe, Takehisa
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Problems with Robin Boundary Conditions
2011In this chapter we consider the third type of fundamental boundary value problems, namely, problems with Robin boundary conditions, where a linear combination of the stresses and displacements is prescribed on \(\partial S\).
Gavin R. Thomson, Christian Constanda
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Wentzell-Robin boundary conditions on C[0,1]
Semigroup Forum, 2002The author considers the operator \(A_W\) on \(C([0,1])\) defined by: \[ \begin{cases} {\mathcal D}(A_W): =\biggl\{u\in C^2\bigl( [0,1]\bigr) \mid(au')'(j)+ \beta_j u'(j)+ \gamma_ju(j)=0,\;j=0,1\biggr\}\\ A_Wu:=(au')',\end{cases} \] where \(\beta_j\), \(\gamma_j\) \((j=0,1)\) are arbitrary real numbers and the function \(a\in C^1([0,1])\) satisfies \(a(
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Doubly nonlinear parabolic equations with Robin boundary conditions
Mathematical Methods in the Applied Sciences, 2022In this article, we consider the nonlinear problem where is the doubly nonlinear operator. Here, is a bounded domain with smooth boundary, and . We establish some sufficient conditions on the functions , and the exponents and , so that the above problem has no positive solutions.
Ismail Kömbe +1 more
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A Hopf bifurcation with Robin boundary conditions
Journal of Dynamics and Differential Equations, 1994zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Ashwin, Peter, Mei, Zhen
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