EDB β€” 1NG

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Exercises

  1. [1NG] Let \(f:ℝ→ℝ\) be a \(C^∞\) class function; fix \(x_ 0∈ ℝ\) and define

    \[ g(x)= βˆ‘_{n=0}^∞\frac{f^{(n)}(x_ 0)}{n!} (x-x_ 0)^ n \]

    using the Taylor series; suppose \(g\) has radius of convergence \(R{\gt}0\): So \(g:J→ℝ\) is a well-defined function, where \(J=(x_ 0-R,x_ 0+R)\). Can it happen that \(f(x)β‰  g(x)\) for a point \(x∈ J\)?

    And if \(f\) is analytic? 1

    Solution 1

    [1NH]

  1. By ”analytic” we mean: fixed \(x_ 0\) there is a series \(h(x)=βˆ‘_{n=0}^∞ a_ n (x-x_ 0)^ n\) with non-zero radius of convergence such that \(f=h\) in an open neighborhood of \(x_ 0\) (neighborhood contained in the convergence disk) .
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Authors: "Mennucci , Andrea C. G." .
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