Tag Archives: 장기정

Concluding 2014 Spring

Thanks all for participating POW actively. Here’s the list of winners:

  • 1st prize (Gold): Lee, Jongwon (이종원) – 2014학번
  • 2nd prize (Silver): Jeong, Seongjin (정성진) – 수리과학과 2013학번
  • 2nd prize (Silver): Jang, Kijoung (장기정) – 2014학번
  • 4th prize: Hwang, Sungho (황성호) – 수리과학과 2013학번
  • 5th prize: Chae, Seok Joo (채석주) – 수리과학과 2013학번

이종원 40
정성진 39
장기정 39
황성호 38
채석주 29
이영민 25
박훈민 18
조준영 17
김경석 17
어수강 16
박경호 15
윤성철 9
장경석 9
김일희 8
안현수 6
오동우 6
정진야 6
이규승 6
Zhang Qiang 5
이시우 5
한대진 5
남재현 5
김범수 4
김정민 4
권현우 3
김동석 3
김은혜 3
김찬민 3
엄문용 3
이상철 3
이주호 3
전한울 3
심병수 3
이승훈 3
배형진 3
서진솔 2
조남경 2
김경민 2
서웅찬 2

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Solution: 2014-11 Subsets of a countably infinite set

Prove or disprove that every uncountable collection of subsets of a countably infinite set must have two members whose intersection has at least 2014 elements.

The best solution was submitted by 장기정. Congratulations!

Alternative solutions were submitted by 이종원(+3), 정성진(+3), 채석주(+3), 황성호(+3), 김경석(+3), 어수강(+3). Two incorrect solutions were submitted (KKM, BHJ).

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Solution: 2014-10 Inequality with pi

Prove that, for any sequences of real numbers \( \{ a_n \} \) and \( \{ b_n \} \), we have
\[
\sum_{m=1}^{\infty} \sum_{n=1}^{\infty} \frac{a_m b_n}{m+n} \leq \pi \left( \sum_{m=1}^{\infty} a_m^2 \right)^{1/2} \left( \sum_{n=1}^{\infty} b_n^2 \right)^{1/2}
\]

The best solution was submitted by 장기정. Congratulations!

Alternative solutions were submitted by 김경석 (+3), 김동석 (+3), 박경호 (+3), 이규승 (+3), 이영민 (+3), 이종원 (+3), 정성진 (+3), 채석주 (+3), 황성호 (+3), Zhang Qiang (+3). Thank you for your participation.

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Solution: 2014-07 Subsequence

Let \(a_1,a_2,\ldots\) be an infinite sequence of positive real numbers such that \(\sum_{n=1}^\infty a_n\) converges. Prove that for every positive constant \(c\), there exists an infinite sequence \(i_1<i_2<i_3<\cdots\) of positive integers such that \(| i_n-cn^3| =O(n^2)\) and  \(\sum_{n=1}^\infty \left( a_{i_n} (a_1^{1/3}+a_2^{1/3}+\cdots+a_{i_n}^{1/3})\right)\) converges.

The best solution was submitted by 장기정(2014학번). Congratulations!

Alternative solutions were submitted by 정성진 (+3), 이종원 (+2), 이영민 (+2), 황성호 (+2), 김경석 (+2), 채석주 (+1). Incorrect solutions were submitted by B.H.J., P.K.H.

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