AbstractFamilies of operators which approximate semi-groups or evolution systems generated by partial differential operators are constructed. Product formulas are used to recover these semi-groups or evolution systems through product integrals. Conditions on generators are provided under which its semi-group or evolution system can be approximated in this way by families of specific types of operators
The d\u27Alembert formula expresses the general solution of the factored equation ΠNj=1(d/dt - Aj)u ...
Many results, both from semigroup theory itself and from the applied sciences, are phrased in discip...
The paper is devoted to a linear dynamics for non-autonomous perturbation of the Gibbs semigroup on ...
A product formula for semigroups of Lipschitz operators associated with semilinear evolution equatio...
AbstractA product formula for semigroups of Lipschitz operators associated with semilinear evolution...
Until now, semigroup solution has been successful mainly for linear and mildly nonlinear initial val...
This research monograph deals with nonlinear evolution operators and semigroups generated by dissipa...
In this paper we give a short overview of operator semigroups. These objects are widely used for pro...
Most dynamical systems arise from differential equations that can be represented as an abstract evol...
1 * Introduction * A linear ordinary differential equation containing a parameter n may be written i...
We obtain necessary and sufficient conditions for a system of partial differential-difference equati...
In this paper we will study the well known problem of production functions in an operator semigroup ...
This book presents an operator-theoretic approach to ill-posed evolution equations. It presents the ...
The integral transform method, associated with operatorial techniques, can be often applied in order...
International audienceThe paper is devoted to evolution equations of the form ∂ ∂t u(t) = −(A + B(t)...
The d\u27Alembert formula expresses the general solution of the factored equation ΠNj=1(d/dt - Aj)u ...
Many results, both from semigroup theory itself and from the applied sciences, are phrased in discip...
The paper is devoted to a linear dynamics for non-autonomous perturbation of the Gibbs semigroup on ...
A product formula for semigroups of Lipschitz operators associated with semilinear evolution equatio...
AbstractA product formula for semigroups of Lipschitz operators associated with semilinear evolution...
Until now, semigroup solution has been successful mainly for linear and mildly nonlinear initial val...
This research monograph deals with nonlinear evolution operators and semigroups generated by dissipa...
In this paper we give a short overview of operator semigroups. These objects are widely used for pro...
Most dynamical systems arise from differential equations that can be represented as an abstract evol...
1 * Introduction * A linear ordinary differential equation containing a parameter n may be written i...
We obtain necessary and sufficient conditions for a system of partial differential-difference equati...
In this paper we will study the well known problem of production functions in an operator semigroup ...
This book presents an operator-theoretic approach to ill-posed evolution equations. It presents the ...
The integral transform method, associated with operatorial techniques, can be often applied in order...
International audienceThe paper is devoted to evolution equations of the form ∂ ∂t u(t) = −(A + B(t)...
The d\u27Alembert formula expresses the general solution of the factored equation ΠNj=1(d/dt - Aj)u ...
Many results, both from semigroup theory itself and from the applied sciences, are phrased in discip...
The paper is devoted to a linear dynamics for non-autonomous perturbation of the Gibbs semigroup on ...