This two volume work presents research workers and graduate students in numerical analysis with a state-of-the-art survey of some of the most active areas of numerical analysis. The work arises from a Summer School covering recent trends in the subject. The chapters are written by the main lecturers at the School each of whom are internationally renowned experts in their respective fields. This extensive coverage of the major areas of research will be invaluable for
both theoreticians and practitioners. This volume covers research in the numerical analysis of nonlinear phenomena: evolution equations, free boundary problems, spectral methods, and
numerical methods for dynamical systems, nonlinear stability, and differential equations on manifolds.
'The standard is consistently high and the book deserves a wide readership among both theoreticians and practitioners.'
ASLIB Booklist, Vol.56, No. 12, December 1991
Preface; L. Wahlbin: Finite element methods for evolution equations; R. Nochetto: Finite element methods for parabolic free boundary problems; A. Quateroni: An introduction to spectral methods for partial differential equations; J.M. Sanz Serna: Two topics in nonlinear stability; W. Beyn: Numerical methods for dynamical systems; W. Rheinboldt: The theory and numerics of differential-algebraic equations.
Series: Advances in Numerical Analysis : Book 1
Number Of Pages: 286
Published: 4th July 1991
Publisher: Oxford University Press
Country of Publication: GB
Dimensions (cm): 23.4 x 15.6
Weight (kg): 0.61