Zobrazeno 1 - 10
of 26
pro vyhledávání: '"Merino, Sandro"'
Autor:
Guidotti, Patrick, Merino, Sandro
A parameter dependent perturbation of the spectrum of the scalar Laplacian is studied for a class of nonlocal and non-self-adjoint rank one perturbations. A detailed description of the perturbed spectrum is obtained both for Dirichlet boundary condit
Externí odkaz:
http://arxiv.org/abs/2007.04958
Autor:
Guidotti, Patrick, Merino, Sandro
The global asymptotic stability of the unique steady state of a nonlinear scalar parabolic equation with a nonlocal boundary condition is studied. The equation describes the evolution of the temperature profile that is subject to a feedback control l
Externí odkaz:
http://arxiv.org/abs/1909.08589
Autor:
Guidotti, Patrick1 (AUTHOR) gpatrick@math.uci.edu, Merino, Sandro2 (AUTHOR)
Publikováno v:
Studies in Applied Mathematics. Apr2021, Vol. 146 Issue 3, p677-729. 53p.
Akademický článek
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Autor:
Guidotti, Patrick, Merino, Sandro
Publikováno v:
Journal of Evolution Equations; Sep2021, Vol. 21 Issue 3, p3205-3241, 37p
Autor:
Merino, Sandro1 sandro.merino@ubs.com, Nyfeler, Mark A2 mark.nyfeler@ubs.com
Publikováno v:
Quantitative Finance. Apr2004, Vol. 4 Issue 2, p199-207. 9p.
Autor:
Merino, Sandro, Pardo San Gil, Rosa
Publikováno v:
Differential Integral Equations 12, no. 6 (1999), 833-848
It is shown that predator-prey type reaction-diffusion systems on the whole real line have a unique coexistence state.
Autor:
Daners, Daniel, Merino, Sandro
We prove that a class of weighted semilinear reaction diffusion equations on RN generates gradient-like semiflows on the Banach space of bounded uniformly continuous functions on RN. If N = 1 we show convergence to a single equilibrium. The key for g
Externí odkaz:
https://explore.openaire.eu/search/publication?articleId=dedup_wf_001::ff0be4a1991a6e2c67b72b49109d1c22
https://doi.org/10.5167/uzh-154382
https://doi.org/10.5167/uzh-154382
Autor:
Merino, Sandro
Publikováno v:
Adv. Differential Equations 1, no. 4 (1996), 579-609
The existence and nonexistence of positive time-periodic solutions of semilinear reaction diffusion systems of the type $$ \begin{cases} \partial_{t}u +\mathcal{A}_{1}u = au-bg_{1}(u)u - h_{1}(u,v)u\\ \partial_{t}v +\mathcal{A}_{2}v = dv-fg_{2}(v)v +