- Home
- Mathematics
- Differential Equations
- Theory of Stabilization for Linear Boundary Control Systems
Theory of Stabilization for Linear Boundary Control Systems
List Price:
$67.99
- Availability: Confirm prior to ordering
- Branding: minimum 50 pieces (add’l costs below)
- Check Freight Rates (branded products only)
Branding Options (v), Availability & Lead Times
- 1-Color Imprint: $2.00 ea.
- Promo-Page Insert: $2.50 ea. (full-color printed, single-sided page)
- Belly-Band Wrap: $2.50 ea. (full-color printed)
- Set-Up Charge: $45 per decoration
- Availability: Product availability changes daily, so please confirm your quantity is available prior to placing an order.
- Branded Products: allow 10 business days from proof approval for production. Branding options may be limited or unavailable based on product design or cover artwork.
- Unbranded Products: allow 3-5 business days for shipping. All Unbranded items receive FREE ground shipping in the US. Inquire for international shipping.
- RETURNS/CANCELLATIONS: All orders, branded or unbranded, are NON-CANCELLABLE and NON-RETURNABLE once a purchase order has been received.
Product Details
Author:
Takao Nambu
Format:
Paperback
Pages:
284
Publisher:
CRC Press (March 31, 2021)
Language:
English
ISBN-13:
9780367782818
Weight:
14.5oz
Dimensions:
6.125" x 9.1875"
File:
TAYLORFRANCIS-TayFran_260513043736269-20260513.xml
Folder:
TAYLORFRANCIS
List Price:
$67.99
Case Pack:
16
As low as:
$64.59
Publisher Identifier:
P-CRC
Discount Code:
H
Country of Origin:
United States
Pub Discount:
30
Imprint:
CRC Press
Overview
This book presents a unified algebraic approach to stabilization problems of linear boundary control systems with no assumption on finite-dimensional approximations to the original systems, such as the existence of the associated Riesz basis. A new proof of the stabilization result for linear systems of finite dimension is also presented, leading to an explicit design of the feedback scheme. The problem of output stabilization is discussed, and some interesting results are developed when the observability or the controllability conditions are not satisfied.
