AbstractA global attractivity theorem is first proved for a class of skew-product semiflows. Then this result is applied to monotone and subhomogeneous almost periodic reaction–diffusion equations, ordinary differential systems and delay differential equations for their global dynamics
AbstractBy employing the continuation theorem of coincidence degree theory, the existence of a posit...
AMS(MOS) subject classifications: 34C27, 34D05, 35B15, 35B40, 35K57, 54H20.The current series of pap...
We study an interesting model, with reaction terms of Lotka-Volterra type, where diffusion and react...
AbstractA global attractivity theorem is first proved for a class of skew-product semiflows. Then th...
Monotone systems are dynamical systems for which the flow preserves a partial order. Some applicatio...
AbstractIn this paper we present new stability and extensibility results for skew-product semiflows ...
AbstractIn this paper, we investigate global stabilization phenomena of certain classical solutions ...
AbstractA system of ODE's is considered as a model of two populations competing for a nutrient, wher...
A method is proposed to prove the global attractor existence for multivalued semiflows with weak con...
AbstractThis paper studies periodic solutions of two types of population models with time delays and...
Let us consider a nonlinear evolution equation associated with time-dependent subdifferential in a s...
In this article, we study the asymptotic dynamics in nonmonotone comparable almost periodic reactio...
In this work the existence of a global attractor for the semiflow of weak solutions of a two-cell B...
AbstractThis work concerns the study of asymptotic behavior of coupled systems of p(x)-Laplacian dif...
In this paper we study the structure of the global attractor for a multivalued semiflow generated by...
AbstractBy employing the continuation theorem of coincidence degree theory, the existence of a posit...
AMS(MOS) subject classifications: 34C27, 34D05, 35B15, 35B40, 35K57, 54H20.The current series of pap...
We study an interesting model, with reaction terms of Lotka-Volterra type, where diffusion and react...
AbstractA global attractivity theorem is first proved for a class of skew-product semiflows. Then th...
Monotone systems are dynamical systems for which the flow preserves a partial order. Some applicatio...
AbstractIn this paper we present new stability and extensibility results for skew-product semiflows ...
AbstractIn this paper, we investigate global stabilization phenomena of certain classical solutions ...
AbstractA system of ODE's is considered as a model of two populations competing for a nutrient, wher...
A method is proposed to prove the global attractor existence for multivalued semiflows with weak con...
AbstractThis paper studies periodic solutions of two types of population models with time delays and...
Let us consider a nonlinear evolution equation associated with time-dependent subdifferential in a s...
In this article, we study the asymptotic dynamics in nonmonotone comparable almost periodic reactio...
In this work the existence of a global attractor for the semiflow of weak solutions of a two-cell B...
AbstractThis work concerns the study of asymptotic behavior of coupled systems of p(x)-Laplacian dif...
In this paper we study the structure of the global attractor for a multivalued semiflow generated by...
AbstractBy employing the continuation theorem of coincidence degree theory, the existence of a posit...
AMS(MOS) subject classifications: 34C27, 34D05, 35B15, 35B40, 35K57, 54H20.The current series of pap...
We study an interesting model, with reaction terms of Lotka-Volterra type, where diffusion and react...
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