组合数学 (Spring 2013)/Problem Set 2: Difference between revisions
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== Problem 1== | == Problem 1== | ||
Prove the following identity: | Prove the following identity: | ||
*<math>\sum_{k=1}^n k{n\choose k}= n2^{n-1}</math>. | *<math>\sum_{k=1}^n k{n\choose k}= n2^{n-1}</math>. | ||
(Hint: Use double counting.) | (Hint: Use double counting.) | ||
== Problem 2 == | |||
Show that among any group of <math>n</math> people, where <math>n\ge 2</math>, there are at least two people who know exactly the same number of people in the group (assuming that "knowing" is a symmetric relation). | |||
== Problem 3 == | |||
Let <math>S</math> be a subset of <math>\{1,2,\ldots,2n\}</math> such that <math>|S|>n</math>. Show that there exist <math>a,b\in S</math> such that <math>a</math> and <math>b</math> are coprime. | |||
== Problem 4 == | == Problem 4 == | ||
(Due to Karger) | |||
Balls of 8 different colors are in 6 bins. There are 20 balls of each color. Prove that there must be a bin containing 2 pairs of balls from the two different colors of balls. | |||
== Problem 5 == | == Problem 5 == | ||
Let <math> | (Erdős-spencer 1974) | ||
Let <math>n</math> coins of weights 0 and 1 be given. We are also given a scale with which we may weigh any subset of the coins. Our goal is to determine the weights of coins (i.e. which coins are 0 and which are 1) with the minimal number of weighings. | |||
This problem can be formalized as follows: A collection <math>S_1,S_1,\ldots,S_m\subseteq [n]</math> is called '''determining''' if an arbitrary subset <math>T\subseteq[n]</math> can be uniquely determined by the cardinalities <math>|S_i\cap T|, 1\le i\le m</math>. | |||
* Prove that the minimum above <math>m</math> gives the minimum number of weighing to determine the weights of <math>n</math> coins. | |||
* Use pigeonhole principle to show that <math>m\ge \frac{n}{\log_2(n+1)}</math>. | |||
Revision as of 10:33, 17 April 2013
Problem 1
Prove the following identity:
- [math]\displaystyle{ \sum_{k=1}^n k{n\choose k}= n2^{n-1} }[/math].
(Hint: Use double counting.)
Problem 2
Show that among any group of [math]\displaystyle{ n }[/math] people, where [math]\displaystyle{ n\ge 2 }[/math], there are at least two people who know exactly the same number of people in the group (assuming that "knowing" is a symmetric relation).
Problem 3
Let [math]\displaystyle{ S }[/math] be a subset of [math]\displaystyle{ \{1,2,\ldots,2n\} }[/math] such that [math]\displaystyle{ |S|\gt n }[/math]. Show that there exist [math]\displaystyle{ a,b\in S }[/math] such that [math]\displaystyle{ a }[/math] and [math]\displaystyle{ b }[/math] are coprime.
Problem 4
(Due to Karger)
Balls of 8 different colors are in 6 bins. There are 20 balls of each color. Prove that there must be a bin containing 2 pairs of balls from the two different colors of balls.
Problem 5
(Erdős-spencer 1974)
Let [math]\displaystyle{ n }[/math] coins of weights 0 and 1 be given. We are also given a scale with which we may weigh any subset of the coins. Our goal is to determine the weights of coins (i.e. which coins are 0 and which are 1) with the minimal number of weighings.
This problem can be formalized as follows: A collection [math]\displaystyle{ S_1,S_1,\ldots,S_m\subseteq [n] }[/math] is called determining if an arbitrary subset [math]\displaystyle{ T\subseteq[n] }[/math] can be uniquely determined by the cardinalities [math]\displaystyle{ |S_i\cap T|, 1\le i\le m }[/math].
- Prove that the minimum above [math]\displaystyle{ m }[/math] gives the minimum number of weighing to determine the weights of [math]\displaystyle{ n }[/math] coins.
- Use pigeonhole principle to show that [math]\displaystyle{ m\ge \frac{n}{\log_2(n+1)} }[/math].