An Introduction to Analysis

I am putting some materials that seem to be beyond the scope of the book Real Analysis, in particular some functional and topological stuff that analysts use today (e.g., complex analysis, a partition of unity, functional analysis). No attention has been given with regard to the organization of the contents as I am not sure at this point. Also, no care and error check have been done; so do not trust the materials presented in the book blindly. -- Taku 10:46, 22 February 2006 (UTC)

Please note that the book is far from complete; some definitions are maybe missing, many proofs unfinished or erroneous, the structure of the book incoherent etc. -- Taku 07:14, 3 May 2007 (UTC)

The following notation will be in use.

• ${\displaystyle E\subset \subset G}$ : ${\displaystyle E\subset K\subset G}$ for some ${\displaystyle K}$ compact.
• ${\displaystyle f\ll G}$ : ${\displaystyle \text{supp }f\subset G}$.
• ${\displaystyle 𝒜(\mathrm{\Omega })}$ = all functions analytic in ${\displaystyle \mathrm{\Omega }}$.
• ${\displaystyle ℬ(\mathrm{\Omega })}$ = all bounded linear operators in ${\displaystyle \mathrm{\Omega }}$.
• ${\displaystyle {𝒞}^k(G)=}$ all functions that are ${\displaystyle k}$-times continuously differentiable in ${\displaystyle G}$. We symbolically let ${\displaystyle k=\mathrm{\infty }}$ when the function is infinitely differentiable.
• ${\displaystyle u^{(k)}={\left(\frac{\partial }{\partial z}\right)}^{k}u}$.
• ${\displaystyle \{fR0\}=\{z:f(z)R0\}}$ where R may be =, <, etc.
• ${\displaystyle \text{supp }f}$ = the closure of ${\displaystyle \{f=0\}}$. (where the closure is taken is "usually" understood in context)
• ${\displaystyle i{d}_E}$ = the identity morphism (e.g., function, operator) on ${\displaystyle E}$.
• ${\displaystyle bE=\overline{E}\int E}$; i.e., the boundary of E (To avoid confusion, we reserve ${\displaystyle \partial }$ for differential stuff.)

We also assume:

• ${\displaystyle \mathbb{N}}$ does not include 0.
• ${\displaystyle 0\ne 1}$. Such insanity does not exist in this book!
• In this book, an analytic function is always complex-valued.
• By paths, we always means a piecewise ${\displaystyle {𝒞}^1}$ curves. (See Chapter 2)

• Sets and topology
  • Set theory
  • Topological space

• /Sequences of numbers

• Calculus

• /Differential forms

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