This book contains the proceedings ofthe meeting on qApplied Mathematics in the Aerospace Field, q held in Erice, Sicily, Italy from September 3 to September 10, 1991. The occasion of the meeting was the 12th Course of the School of Mathematics qGuido Stampacchia, q directed by Professor Franco Giannessi of the University of Pisa. The school is affiliated with the International Center for Scientific Culture qEttore Majorana, q which is directed by Professor Antonino Zichichi of the University of Bologna. The objective of the course was to give a perspective on the state-of the-art and research trends concerning the application of mathematics to aerospace science and engineering. The course was structured with invited lectures and seminars concerning fundamental aspects of differential equa tions, mathematical programming, optimal control, numerical methods, per turbation methods, and variational methods occurring in flight mechanics, astrodynamics, guidance, control, aircraft design, fluid mechanics, rarefied gas dynamics, and solid mechanics. The book includes 20 chapters by 23 contributors from the United States, Germany, and Italy and is intended to be an important reference work on the application of mathematics to the aerospace field. It reflects the belief of the course directors that strong interaction between mathematics and engineering is beneficial, indeed essential, to progresses in both areas.Moving up to the 2nd box, one seeks for each of the several values of s3 in an interval of interest an optimal (X2}, denoted ... Indeed, if s were a vector of m elements, Rimin would grow from a line plot into a hypersurface in m dimensions.
|Title||:||Applied Mathematics in Aerospace Science and Engineering|
|Author||:||Angelo Miele, Attilio Salvetti|
|Publisher||:||Springer Science & Business Media - 2013-11-21|