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Molecular Diversity of Three Forensically Relevant Dipterans from Cadavers in Lahore, Pakistan. [PDF]
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Blow-up of error estimates in time-fractional initial-boundary value problems
, 2020Time-fractional initial-boundary value problems of the form $D_t^\alpha u-p \varDelta u +cu=f$ are considered, where $D_t^\alpha u$ is a Caputo fractional derivative of order $\alpha \in (0,1)$ and the spatial domain lies in $\mathbb{R}^d$ for some $d ...
Hu Chen, M. Stynes
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A critical blow-up exponent for flux limiation in a Keller-Segel system
Indiana University Mathematics Journal, 2020The parabolic-elliptic cross-diffusion system \[ \left\{ \begin{array}{l} u_t = \Delta u - \nabla \cdot \Big(uf(|\nabla v|^2) \nabla v \Big), \\[1mm] 0 = \Delta v - \mu + u, \qquad \int_\Omega v=0, \qquad \mu:=\frac{1}{|\Omega|} \int_\Omega u dx, \
M. Winkler
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Applicable Analysis, 2008
In this article we highlight how the Fonseca and Muller blow-up technique is particularly well suited for homogenization problems. As examples we give a simple proof of the non-linear homogenization theorem for integral functionals and we prove a homogenization theorem for sets of finite perimeter.
Braides A., Maslennikov M., Sigalotti L.
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In this article we highlight how the Fonseca and Muller blow-up technique is particularly well suited for homogenization problems. As examples we give a simple proof of the non-linear homogenization theorem for integral functionals and we prove a homogenization theorem for sets of finite perimeter.
Braides A., Maslennikov M., Sigalotti L.
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Combinatorica, 1997
Some earlier proofs are strengthened and refined to give the following theorem (called the blow-up lemma). Given a graph \(R\), natural number \(\Delta\), and some \(\delta>0\), there exists some \(\varepsilon>0\) that the following holds. Blow up every vertex of \(R\) to some larger set and build two graphs, \(G\) and \(G'\), on the enlarged set as ...
Endre Szemerédi +2 more
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Some earlier proofs are strengthened and refined to give the following theorem (called the blow-up lemma). Given a graph \(R\), natural number \(\Delta\), and some \(\delta>0\), there exists some \(\varepsilon>0\) that the following holds. Blow up every vertex of \(R\) to some larger set and build two graphs, \(G\) and \(G'\), on the enlarged set as ...
Endre Szemerédi +2 more
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ANNALI DELL UNIVERSITA DI FERRARA, 1978
In this paper we define a new kind of blowing-up, as a functor from the category of real analytic spaces to the category of real semianalytic spaces, in such a way that orientability is preserved. Then we prove an existence theorem for «oriented blowing-ups» of real analytic spaces.
Francesco Paolo, Di Stefano
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In this paper we define a new kind of blowing-up, as a functor from the category of real analytic spaces to the category of real semianalytic spaces, in such a way that orientability is preserved. Then we prove an existence theorem for «oriented blowing-ups» of real analytic spaces.
Francesco Paolo, Di Stefano
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