Answer to Question #345755 in Real Analysis for Roy

ANSWER. The statement is true in the following cases :

1) the radius of convergence of the series "\\sum_{n=0}^{\\infty}a_{n}x^{n}" is "\\infty"

2) the convergence set of the series is the segment "[-R,R]"

3) Points "\\alpha, \\beta" are not end points of the set "]-R,R[" (the convergence set of the series is the "]-R,R]" or "[-R,R[, or ]-R,R[" )

If at least point one of the points "\\alpha, \\beta" is the end point of the set indicated in 3) , then the statement is not true.

EXPLANATION

Note , that "|a_{n}x^{n}|=|a_{n}(-x)^{n}|" . Therefore, if one of the series

"\\sum_{n=0}^{\\infty}a_{n}x^{n}" (1)

"\\sum_{n=0}^{\\infty}a_{n}(-x)^{n}" (2)

in a point "c" absolutely converges , then the other converges absolutely. Since the power series in the interval of converges "]-R,R[" converge absolutely , then the series (1) and (2) have the same radius of converges. Since the power series converges uniformly on any segment "[\\alpha, \\beta]\\subset ]-R,R[" , then both series (1), (2) converge uniformly on "]\\alpha,\\beta[\\subset[\\alpha, \\beta]" . This proves 1),2),3).

Let series (1) diverge at one of the point "-R,R" (or both)

Suppose , that "\\alpha=-R" and both series (1), (2) converge uniformly on "]-R,\\beta[" . There are limits at the point "(-R)" for all "n\\in \\N"

"\\lim_{x\\rightarrow(-R)^{-}} {a_{n}}x^{n}=a_{n}(-R)^{n}\\, \\, , \\, \\lim_{x\\rightarrow(-R)^{-}} {a_{n}}(-x) ^{n}=a_{n}( R)^{n}\\, ." By the theorem on the

limit of the sum of the power series we have the equalities

  "\\lim_{x\\rightarrow (-R)^{-}}\\sum_{n=0}^{\\infty} a_{n}x^{n}=\\sum_{n=0}^{\\infty} a_{n}(-R )^{n} \\\\\\lim_{x\\rightarrow (-R)^{-}}\\sum_{n=0}^{\\infty} a_{n}(-x) ^{n}=\\sum_{n=0}^{\\infty} a_{n}R^{n}"

and the series on the right converge.Therefore, the series (1) converges on the "[-R,R]" in contrast to the assumption.