Coles

Loading Inventory...
Almost Periodicity and Almost Automorphy: for Evolution Equations and Partial Functional Differential Equations

Almost Periodicity and Almost Automorphy: for Evolution Equations and Partial Functional Differential Equations in Ottawa, ON

By None

Current price: $152.99
Visit retailer's website
Almost Periodicity and Almost Automorphy: for Evolution Equations and Partial Functional Differential Equations

By None

Almost Periodicity and Almost Automorphy: for Evolution Equations and Partial Functional Differential Equations in Ottawa, ON

Current price: $152.99
Loading Inventory...

Size: Paperback

Visit retailer's website
*Product information may vary - to confirm product availability, pricing, shipping and return information please contact Coles
When we study differential equations in Banach spaces whose coefficients are linear unbounded operators, we feel that we are working in ordinary differential equations; however, the fact that the operator coefficients are unbounded makes things quite different from what is known in the classical case. Examples or applications for such equations are naturally found in the theory of partial differential equations. More specifically, if we give importance to the time variable at the expense of the spatial variables, we obtain an “ordinary differential equation” with respect to the variable which was put in evidence. Thus, for example, the heat or the wave equation gives rise to ordinary differential equations of this kind. Adding boundary conditions can often be translated in terms of considering solutions in some convenient functional Banach space. The theory of semigroups of operators provides an elegant approach to study this kind of systems. Therefore, we can frequently guess or even prove theorems on differential equations in Banach spaces looking at a corresponding pattern in finite dimensional ordinary differential equations.
When we study differential equations in Banach spaces whose coefficients are linear unbounded operators, we feel that we are working in ordinary differential equations; however, the fact that the operator coefficients are unbounded makes things quite different from what is known in the classical case. Examples or applications for such equations are naturally found in the theory of partial differential equations. More specifically, if we give importance to the time variable at the expense of the spatial variables, we obtain an “ordinary differential equation” with respect to the variable which was put in evidence. Thus, for example, the heat or the wave equation gives rise to ordinary differential equations of this kind. Adding boundary conditions can often be translated in terms of considering solutions in some convenient functional Banach space. The theory of semigroups of operators provides an elegant approach to study this kind of systems. Therefore, we can frequently guess or even prove theorems on differential equations in Banach spaces looking at a corresponding pattern in finite dimensional ordinary differential equations.

More About Coles at Bayshore Shopping Centre

Coles is renowned for its outstanding customer service and great selection of books. Along with the vast array of magazines, stationary, audio-books, children's literature, fiction, non-fiction and reference books, you can find accessories to make your reading experience more pleasurable. We can recommend the very best in reading today. We will help you search our titles for exactly what you need, and if we do not have it in stock, we will order it for you.

100 Bayshore Dr, Nepean, ON K2B 8C1, Canada

Find Coles at Bayshore Shopping Centre in Ottawa, ON

Visit Coles at Bayshore Shopping Centre in Ottawa, ON
Powered by Adeptmind