Difference between revisions of "Conditional convergence"
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''of a series'' | ''of a series'' | ||
| − | A property of series, stating that the given series converges after a certain (possibly trivial) rearrangement of its terms. A series of numbers | + | A property of series, stating that the given series converges after a |
| − | + | certain (possibly trivial) rearrangement of its terms. A series of | |
| − | + | numbers | |
| − | + | $$\sum_{n=1}^\infty u_n\label{*}$$ | |
| − | is unconditionally convergent if it converges itself, as well as any series obtained by rearranging its terms, while the sum of any such series is the same; in other words: The sum of an unconditionally-convergent series does not depend on the order of its terms. If the series (*) converges, but not unconditionally, then it is said to be conditionally convergent. For the series (*) to be conditionally convergent it is necessary and sufficient that it converges and does not absolutely converge, i.e. that | + | is unconditionally convergent if it converges itself, as |
| − | + | well as any series obtained by rearranging its terms, while the sum of | |
| − | + | any such series is the same; in other words: The sum of an | |
| + | unconditionally-convergent series does not depend on the order of its | ||
| + | terms. If the series (*) converges, but not unconditionally, then it | ||
| + | is said to be conditionally convergent. For the series (*) to be | ||
| + | conditionally convergent it is necessary and sufficient that it | ||
| + | converges and does not absolutely converge, i.e. that $\sum_{n=1}^\infty |u_n| = +\infty$. | ||
| − | + | If the terms of the series (*) are real numbers, if the non-negative | |
| + | terms are denoted by $u_1^+, u_2^+,\dots $ and the negative terms by $-u_1^-, -u_2^-,\dots $ then the series | ||
| + | (*) is conditionally convergent if and only both series $\sum_{n=1}^\infty u_n^+ $ and $\sum_{n=1}^\infty u_n^- $ | ||
| + | diverge (here the order of the terms in the series is immaterial). | ||
| − | + | Let the series (*) of real numbers be conditionally convergent and let | |
| + | $-\infty\le \alpha < \beta \le +\infty$, then there exists a series $\sum_{n=1}^\infty u_n^*$, obtained by rearranging the terms | ||
| + | of (*), such that if $\{s_n^*\}$ denotes its sequence of partial sums, then | ||
| − | (this is a generalization of Riemann's theorem, cf. [[Riemann theorem|Riemann theorem]] 2). | + | $$\underline{\lim}_{n\to\infty}\; s_n^* = \alpha,\quad \overline{\lim}_{n\to\infty}\; s_n^* = \beta$$ |
| + | (this is a generalization of Riemann's theorem, cf. | ||
| + | [[Riemann theorem|Riemann theorem]] 2). | ||
| − | The product of two conditionally-convergent series depends on the order in which the result of the term-by-term multiplication of the two series is summed. | + | The product of two conditionally-convergent series depends on the |
| + | order in which the result of the term-by-term multiplication of the | ||
| + | two series is summed. | ||
| − | The concepts of conditional and unconditional convergence of series may be generalized to series with terms in some normed vector space | + | The concepts of conditional and unconditional convergence of series |
| + | may be generalized to series with terms in some normed vector space | ||
| + | $X$. If $X$ is a finite-dimensional space then, analogously to the | ||
| + | case of series of numbers, a convergent series $\sum_{n=1}^\infty u_n$, $u_n\in X$, $n=1,2,\dots$ is | ||
| + | conditionally convergent if and only if the series $\sum_{n=1}^\infty \|u_n\|_X$ is | ||
| + | divergent. If, however, $X$ is infinite dimensional, then there exist | ||
| + | unconditionally-convergent series $\sum_{n=1}^\infty \|u_n\|_X = +\infty$. | ||
====Comments==== | ====Comments==== | ||
| − | A very useful reference on convergence and divergence of series with elements in abstract spaces is [[#References|[a1]]]. | + | A very useful reference on convergence and divergence |
| + | of series with elements in abstract spaces is | ||
| + | [[#References|[a1]]]. | ||
====References==== | ====References==== | ||
| − | <table><TR><TD valign="top">[a1]</TD> <TD valign="top"> | + | <table><TR><TD valign="top">[a1]</TD> |
| + | <TD valign="top"> J. Lindenstrauss, L. Tzafriri, "Classical Banach spaces" , '''1. Sequence spaces''' , Springer (1977)</TD> | ||
| + | </TR><TR><TD valign="top">[a2]</TD> | ||
| + | <TD valign="top"> W. Rudin, "Principles of mathematical analysis" , McGraw-Hill (1976) pp. 107–108</TD> | ||
| + | </TR></table> | ||
Latest revision as of 20:20, 12 December 2014
2020 Mathematics Subject Classification: Primary: 40A05 [MSN][ZBL]
of a series
A property of series, stating that the given series converges after a certain (possibly trivial) rearrangement of its terms. A series of numbers $$\sum_{n=1}^\infty u_n\label{*}$$ is unconditionally convergent if it converges itself, as well as any series obtained by rearranging its terms, while the sum of any such series is the same; in other words: The sum of an unconditionally-convergent series does not depend on the order of its terms. If the series (*) converges, but not unconditionally, then it is said to be conditionally convergent. For the series (*) to be conditionally convergent it is necessary and sufficient that it converges and does not absolutely converge, i.e. that $\sum_{n=1}^\infty |u_n| = +\infty$.
If the terms of the series (*) are real numbers, if the non-negative terms are denoted by $u_1^+, u_2^+,\dots $ and the negative terms by $-u_1^-, -u_2^-,\dots $ then the series (*) is conditionally convergent if and only both series $\sum_{n=1}^\infty u_n^+ $ and $\sum_{n=1}^\infty u_n^- $ diverge (here the order of the terms in the series is immaterial).
Let the series (*) of real numbers be conditionally convergent and let $-\infty\le \alpha < \beta \le +\infty$, then there exists a series $\sum_{n=1}^\infty u_n^*$, obtained by rearranging the terms of (*), such that if $\{s_n^*\}$ denotes its sequence of partial sums, then
$$\underline{\lim}_{n\to\infty}\; s_n^* = \alpha,\quad \overline{\lim}_{n\to\infty}\; s_n^* = \beta$$ (this is a generalization of Riemann's theorem, cf. Riemann theorem 2).
The product of two conditionally-convergent series depends on the order in which the result of the term-by-term multiplication of the two series is summed.
The concepts of conditional and unconditional convergence of series may be generalized to series with terms in some normed vector space $X$. If $X$ is a finite-dimensional space then, analogously to the case of series of numbers, a convergent series $\sum_{n=1}^\infty u_n$, $u_n\in X$, $n=1,2,\dots$ is conditionally convergent if and only if the series $\sum_{n=1}^\infty \|u_n\|_X$ is divergent. If, however, $X$ is infinite dimensional, then there exist unconditionally-convergent series $\sum_{n=1}^\infty \|u_n\|_X = +\infty$.
Comments
A very useful reference on convergence and divergence of series with elements in abstract spaces is [a1].
References
| [a1] | J. Lindenstrauss, L. Tzafriri, "Classical Banach spaces" , 1. Sequence spaces , Springer (1977) |
| [a2] | W. Rudin, "Principles of mathematical analysis" , McGraw-Hill (1976) pp. 107–108 |
Conditional convergence. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Conditional_convergence&oldid=19008