01273nam a2200325 i 450099100068258970753620020507172220.0961116s1965 us ||| | eng b10742621-39ule_instLE01300656ExLDip.to Matematicaeng515.94AMS 32AAMS 32EGunning, Robert Clifford41063Analytic functions of several complex variables /Robert C. Gunning and Hugo RossiEnglewood Cliffs, N. J. :Prentice-Hall,c1965xii, 317 p. :ill. ;24 cm.Prentice-Hall series in modern analysis"References": p. 296. Bibliography: p. 297-311Functional analysisFunctions of several complex variablesHolomorphic convexityRossi, Hugoauthorhttp://id.loc.gov/vocabulary/relators/aut47457.b1074262123-02-1728-06-02991000682589707536LE013 32A GUN11 (1965)12013000068497le013-E0.00-l- 01010.i1083404728-06-02Analytic functions of several complex variables354453UNISALENTOle01301-01-96ma -engus 0104006nam 2200601 a 450 991013924550332120230803023836.01-118-57524-51-118-57475-31-118-57489-3(CKB)2560000000103966(EBL)1215788(OCoLC)851175080(SSID)ssj0000972015(PQKBManifestationID)11614977(PQKBTitleCode)TC0000972015(PQKBWorkID)10946465(PQKB)10794074(MiAaPQ)EBC1215788(Au-PeEL)EBL1215788(CaPaEBR)ebr10720718(CaONFJC)MIL499220(EXLCZ)99256000000010396620130621d2013 uy 0engur|n|---|||||txtccrLoop-shaping robust control[electronic resource] /Philippe FeyelLondon ISTE20131 online resource (287 p.)Automation-control and industrial engineering seriesDescription based upon print version of record.1-84821-465-0 Includes bibliographical references and index.Cover; Title Page; Contents; Introduction; Chapter 1. The Loop-shaping Approach; 1.1. Principle of the method; 1.1.1. Introduction; 1.1.2. Sensitivity functions; 1.1.3. Declination of performance objectives; 1.1.4. Declination of the robustness objectives; 1.2. Generalized phase and gain margins; 1.2.1. Phase and gain margins at the model's output; 1.2.2. Phase and gain margins at the model's input:; 1.3. Limitations inherent to bandwidth; 1.4. Examples; 1.4.1. Example 1: sinusoidal disturbance rejection; 1.4.2. Example 2: reference tracking and friction rejection2.2.1. Taking account of modeling uncertainties2.2.2. Stability robustness for a coprime factor plant description; 2.2.3. Property of the equivalent "weighted mixed sensitivity" form; 2.2.4. Expression of the synthesis criterion in "4-blocks" equivalent form; 2.3. Explicit solution of the problem of robust stabilization of coprime factor plant descriptions; 2.3.1. Expression of the prob; 2.3.2. Explicit resolution of the robust stabilization problem; 2.4. Robustness and u-gap; 2.4.1. u-gap and ball of plants; 2.4.2. Robustness results associated with the u-gap3.2. Two-step approach3.2.1. General formulation; 3.2.2. Simplification of the problem by the Youla parameterization; 3.2.3. Extension; 3.2.4. Setting of the weighting functions; 3.2.5. Associated performance robustness result; 3.3. One-step approach; 3.3.1. General formulation; 3.3.2. Expression of the problem by Youla parameterization; 3.3.3. Associated performance robustness result; 3.3.4. Connection between the approach and loop-shaping synthesis; 3.4. Comparison of the two approaches; 3.5. Example; 3.5.1. Optimization of an existing controller (continued) - scanning3.6. Compensation for a measurable disturbance at the model's output The loop-shaping approach consists of obtaining a specification in relation to the open loop of the control from specifications regarding various closed loop transfers, because it is easier to work on a single transfer (in addition to the open loop) than on a multitude of transfers (various loopings such as set point/error, disturbance/error, disturbance/control, etc.). The simplicity and flexibility of the approach make it very well adapted to the industrial context.This book presents the loop-shaping approach in its entirety, starting with the declension of high-level specificationsISTERobust controlRobust control.629.8Feyel Philippe893212MiAaPQMiAaPQMiAaPQBOOK9910139245503321Loop-shaping robust control2078166UNINA