00000cam a22000003i 4500 UP-1685594773861620750 Buklod 20081002121325.0 j|||||||||||||| | ta 180206t19941969maua r |||1 u|eng d 0817637079 (alk. paper) (iLib)UPBAG-00004015148 DLC BAG rda eng QA 303 E292 1994 Edwards, Harold M. author. Advanced calculus a differential forms approach Harold M. Edwards. [Third edition]. Boston Birkhäuser 1994 ©1969. xv, 508 pages illustrations 26 cm text rdacontent unmediated rdamedia volume rdacarrier Includes index. ch. 1 Constant forms -- 1.1 One-forms -- 1.2 Two-forms -- 1.3 The Evaluation of the two-forms, pullbacks -- 1.4 Three-forms -- 1.5 Summary -- ch. 2 Integrals 2.1 Non-constant forms -- 2.2 Integration -- 2.3 Definition of certain simple integrals, convergence and the cauchy criterion -- 2.4 Integrals and pullbacks -- 2.5 Independence -- 2.6 Summary, Basic properties of integrals ch. 3 Integration and differentiation -- 3.1 The Fundamental theorum of calculus -- 3.2 The Fundamental theorum of two dimensions -- 3.3 The Fundamental theorum of three dimensions -- 3.4 Summary, Stokes theorum -- ch. 4 Linear algebra -- 4.1 Introduction -- 4.2 Constant k-form on n-space -- 4.3 Matrix notation, Jacobians -- 4.4 The Implicit function theorem for Affine maps -- 4.5 Abstract vector spaces -- 4.6 Summary, Affine manifolds -- ch. 5 Differential calculus -- 5.1 The Implicit function theorem for differentiable maps -- 5.2 k-forms on n-space. Differentiable maps -- 5.3 Proofs -- 5.4 Application: Lagrange multipliers -- 5.5 Summary, Differentiable manifolds ch. 6 Integral calculus-- 6.1 Summary -- 6.2 k-dimensional volume -- 6.3 Independence of parameter and the definiton of sine -- 6.4 Manifolds-with-boundary and Stokes' theorem -- 6.5 General properties of integrals -- 6.6 Integrals as functions of S ch. 7 Practical methods of solution -- 7.1 Successive approximation -- 7.2 Solution of linear equations -- 7.3 Newton's method -- 7.4 Solution of ordinary differntial equations -- 7.5 Three global problems -- ch. 8 Applications -- 8.1 Vector calculus -- 8.2 Elementary differential equations-- 8.3 Harmonic functions and conformal coordinates -- 8.4 Functions of a complex variable -- 8.5 Integrability conditions -- 8.6 Introduction to homology theory-- 8.7 Flows-- 8.8 Applications of mathematical physics -- ch. 9 Further study of limits -- 9.1 The Real number system -- 9.2 Real functions of real variables -- 9.3 Uniform continuity and differentiability -- 9.4 Compactness -- 9.5 Other types of limits -- 9.6 Interchange of limits -- 9.7 Lebesgue integration -- 9.8 Banach spaces. Originally published Boston : Houghton Mifflin Company, ©1969. Calculus. FO UPBAG UPBAG-MAIN QA 303 E292 1994 Book