نتایج جستجو برای: blow up set

تعداد نتایج: 1500945  

Journal: :Journal of Computational and Applied Mathematics 1998

Journal: :New Journal of Physics 2017

Journal: :Tempo Social 2000

Journal: :Tohoku Mathematical Journal 2004

Journal: :Canadian Journal of Mathematics 2022

Abstract We apply capacities to explore the space–time fractional dissipative equation: (0.1) $$ \begin{align} \left\{\begin{aligned} &\partial^{\beta}_{t}u(t,x)=-\nu(-\Delta)^{\alpha/2}u(t,x)+f(t,x),\quad (t,x)\in\mathbb R^{1+n}_{+},\\ &u(0,x)=\varphi(x),\ x\in\mathbb R^{n}, \end{aligned}\right. \end{align} where $\alpha>n$ and $\beta \in (0,1)$ . In this paper, we focus on regulari...

Journal: :Appl. Math. Lett. 2004
Huiling Li Mingxin Wang

This paper deals with blow-up properties of solutions to a semilinear parabolic system with nonlinear localized source involved a product with local terms ut = Δu+ exp{mu(x,t)+nv(x0 ,t)}, vt = Δv+ exp{pu(x0,t)+qv(x,t)} with homogeneous Dirichlet boundary conditions. We investigate the influence of localized sources and local terms on blow-up properties for this system, and prove that: (i) when ...

2004
Alberto Bressan Massimo Fonte

We study the possibility of finite-time blow-up for a two dimensional Broadwell model. In a set of rescaled variables, we prove that no self-similar blow-up solution exists, and derive some a priori bounds on the blow-up rate. In the final section, a possible blow-up scenario is discussed. 1 Introduction Consider the simplified model of a gas whose particles can have only finitely many speeds, ...

2007
Christophe Sabot

Starting from a nitely ramiied self-similar set X we can construct an unbounded set X <1> by blowing-up the initial set X. We consider random blow-ups and prove elementary properties of the spectrum of the natural Laplace operator on X <1> (and on the associated lattice). We prove that the spectral type of the operator is almost surely deterministic with the blow-up and that the spectrum coinci...

2012
Maan Abdulkadhim Rasheed Omar Lakkis

This thesis is concerned with the study of the Blow-up phenomena for parabolic problems, which can be defined in a basic way as the inability to continue the solutions up to or after a finite time, the so called blow-up time. Namely, we consider the blow-up location in space and its rate estimates, for special cases of the following types of problems: (i) Dirichlet problems for semilinear equat...

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