Bifurcation Behaviors of Steady-State Solution to a Discrete General Brusselator Model

We study the local and global bifurcation of nonnegative nonconstant solutions of a discrete general Brusselator model. We generalize the linear u in the standard Brusselator model to the nonlinear fu. Assume that f∈C0,∞,0,∞ is a strictly increasing function, and f′f−1a∈0,∞. Taking b as the bifurcation parameter, we obtain that the solution set of the problem constitutes a constant solution curve and a nonconstant solution curve in a small neighborhood of the bifurcation point b0j,f−1a,ab/f−1a2. Moreover, via the Rabinowitz bifurcation theorem, we obtain the global structure of the set of nonconstant solutions under the condition that fs/s2 is nonincreasing in 0,∞. In this process, we also make a priori estimation for the nonnegative nonconstant solutions of the problem.

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Local and global bifurcation of steady states to a general Brusselator model

Advances in Difference Equations ◽

10.1186/s13662-019-2426-4 ◽

2019 ◽

Vol 2019 (1) ◽

Author(s):

Zhongzi Zhao ◽

Ruyun Ma

Keyword(s):

Global Bifurcation ◽

Steady States ◽

Global Structure ◽

Bifurcation Parameter ◽

Bifurcation Theorem ◽

Brusselator Model ◽

Increasing Function

AbstractIn this paper, we consider the local and global bifurcation of nonnegative nonconstant solutions of a general Brusselator model $$ \textstyle\begin{cases} -d_{1}\triangle u=a-(b+1)f(u)+u^{2}v, & x\in \varOmega , \\ -d_{2}\triangle v=bf(u)-u^{2}v, & x\in \varOmega , \\ \frac{\partial u}{\partial n}=\frac{\partial v}{\partial n}=0, & x\in \partial \varOmega , \end{cases} $${−d1△u=a−(b+1)f(u)+u2v,x∈Ω,−d2△v=bf(u)−u2v,x∈Ω,∂u∂n=∂v∂n=0,x∈∂Ω, where $d_{1},d_{2},a>0$d1,d2,a>0 are fixed parameters with $d_{2}>d_{1}$d2>d1, $b>0$b>0 is a bifurcation parameter; $f\in C([0,\infty ) ,[0,\infty ))$f∈C([0,∞),[0,∞)) is a strictly increasing function and $f'(f^{-1}(a))\in (0,\infty )$f′(f−1(a))∈(0,∞). Moreover, via the Rabinowitz bifurcation theorem, we obtain the global structure of nonconstant solutions under the condition that $\frac{f(s)}{s^{2}}$f(s)s2 is nonincreasing in $(0,\infty )$(0,∞).

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Nonlocal elastodynamics and fracture

Nonlinear Differential Equations and Applications NoDEA ◽

10.1007/s00030-021-00683-x ◽

2021 ◽

Vol 28 (3) ◽

Author(s):

Robert P. Lipton ◽

Prashant K. Jha

Keyword(s):

Field Theory ◽

Brittle Fracture ◽

A Priori ◽

Nonlocal Model ◽

Elastic Fields ◽

Nonlocal Field Theory ◽

Nonlocal Field ◽

Increasing Function ◽

Non Locality

AbstractA nonlocal field theory of peridynamic type is applied to model the brittle fracture problem. The elastic fields obtained from the nonlocal model are shown to converge in the limit of vanishing non-locality to solutions of classic plane elastodynamics associated with a running crack. We carry out our analysis for a plate subject to mode one loading. The length of the crack is prescribed a priori and is an increasing function of time.

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Low Dynamics RLSL Adaptive Algorithm Using A Priori Estimation Errors

10.1109/iccgi.2006.48 ◽

2006 ◽

Cited By ~ 1

Author(s):

C. Paleologu ◽

S. Ciochina ◽

A.A. Enescu

Keyword(s):

Adaptive Algorithm ◽

A Priori ◽

Estimation Errors ◽

A Priori Estimation

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A priori estimation of solutions of a boundary problem for a pseudodifferential equation with degeneration

Izvestiya Vysshikh Uchebnykh Zavedenii. Matematika ◽

10.26907/0021-3446-2021-5-6-10 ◽

2021 ◽

pp. 6-10

Author(s):

Alexander Dmitrievich Baev ◽

◽

Dmitry Alexandrovich Chechin ◽

Sergey Alexandrovich Shabrov ◽

Natalya Ivanovna Rabotinskaya ◽

...

Keyword(s):

Boundary Problem ◽

A Priori ◽

Pseudodifferential Equation ◽

A Priori Estimation

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Loop Type Subcontinua of Positive Solutions for Indefinite Concave-Convex Problems

Advanced Nonlinear Studies ◽

10.1515/ans-2018-2027 ◽

2019 ◽

Vol 19 (2) ◽

pp. 391-412

Author(s):

Uriel Kaufmann ◽

Humberto Ramos Quoirin ◽

Kenichiro Umezu

Keyword(s):

Elliptic Equations ◽

Bifurcation Theory ◽

A Priori ◽

Global Bifurcation ◽

Neumann Boundary ◽

Zero Solution ◽

Regularization Scheme ◽

Convex Problems ◽

Nonnegative Solutions ◽

Indefinite Weights

AbstractWe establish the existence of loop type subcontinua of nonnegative solutions for a class of concave-convex type elliptic equations with indefinite weights, under Dirichlet and Neumann boundary conditions. Our approach depends on local and global bifurcation analysis from the zero solution in a nonregular setting, since the nonlinearities considered are not differentiable at zero, so that the standard bifurcation theory does not apply. To overcome this difficulty, we combine a regularization scheme with a priori bounds, and Whyburn’s topological method. Furthermore, via a continuity argument we prove a positivity property for subcontinua of nonnegative solutions. These results are based on a positivity theorem for the associated concave problem proved by us, and extend previous results established in the powerlike case.

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