高级算法 (Fall 2023)/Problem Set 1
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Problem 1 (Min-cut/Max-cut)
- [counting [math]\displaystyle{ \alpha }[/math]-approximate min-cut] For any $\alpha \ge 1$, a cut is called an $\alpha$-approximate min-cut in a multigraph $G$ if the number of edges in it is at most $\alpha$ times that of the min-cut. Prove that the number of $\alpha$-approximate min-cuts in a multigraph $G$ is at most $n^{2\alpha} / 2$. Hint: Run Karger's algorithm until it has $\lceil 2\alpha \rceil $ supernodes. What is the chance that a particular $\alpha$-approximate min-cut is still available? How many possible cuts does this collapsed graph have?
- [weighted min-cut problem]
- [max directed-cut]
Problem 2 (Fingerprinting)
- [Polynomial Identity Testing]
- [Test isomorphism of rooted tree]
- [2D pattern matching]
Problem 3 (Hashing)
- [Bloom filter]
- [Count Distinct Element]
Problem 4 (Concentration of measure)
- [[math]\displaystyle{ k }[/math]-th moment bound]
- [the median trick]
- [cut size in random graph]
- [code rate of boolean code]
- [balls into bins with the "power of two choices"]
Problem 5 (Dimension reduction)
- [inner product]
- [linear separability]
- [sparse vector]
Problem 1 (Lovász Local Lemma)
- [colorable hypergrap]
- [directed cycle]
- [algorithmic LLL]