Calculus On Manifolds: A Modern Approach To Classical Theorems Of Advanced CalculusCRC Press, 2018/05/04 - 162 ページ This little book is especially concerned with those portions of ?advanced calculus? in which the subtlety of the concepts and methods makes rigor difficult to attain at an elementary level. The approach taken here uses elementary versions of modern methods found in sophisticated mathematics. The formal prerequisites include only a term of linear algebra, a nodding acquaintance with the notation of set theory, and a respectable first-year calculus course (one which at least mentions the least upper bound (sup) and greatest lower bound (inf) of a set of real numbers). Beyond this a certain (perhaps latent) rapport with abstract mathematics will be found almost essential. |
目次
1 | |
Differentiation | 15 |
xii | 46 |
Integration on Chains | 75 |
Integration on Manifolds | 109 |
Bibliography | 139 |
他の版 - すべて表示
多く使われている語句
B₁ boundary Calculus on Manifolds called closed curves closed rectangle continuously differentiable coordinate system Define f definition denoted Df(a Dif(a differentiable function div F dy Ʌ dz equation Euclidean Space f(a¹ Figure finite number follows Fubini's theorem function f ƒ is differentiable ƒ is integrable graph of ƒ Hint inner product Integration on Chains Integration on Manifolds interior Jordan-measurable k-dimensional manifold k-form k-tensor Let A CR Let f Let ƒ lim h→0 linear transformation matrix Michael Spivak Möbius strip ms(f n-chain notation open cover open rectangle open set open set containing orientation-preserving partial derivatives partition of unity Problem Proof prove Show that ƒ singular n-cube Stokes subrectangle subset Suppose Theorem 2-2 unique usual orientation V₁ vector field vector space volume element Ʌ dy Σ Σ