Improved Sublinear Algorithms for Classical and Quantum Graph Coloring

Abstract

We present three sublinear randomized algorithms for vertex-coloring of graphs with maximum degree . The first is a simple algorithm that extends the idea of Morris and Song to color graphs with maximum degree using +1 colors. Combined with the greedy algorithm, it achieves an expected runtime of O(n3/2 n) in the query model, improving on Assadi, Chen, and Khanna's algorithm by a n factor in expectation. When we allow quantum queries to the graph, we can accelerate the first algorithm using Grover's famous algorithm, resulting in a runtime of O(n4/3) quantum queries. Finally, we introduce a quantum algorithm for (1+ε)-coloring, achieving O(ε-1n5/43/2n) quantum queries, offering a polynomial improvement over the previous best bound by Morris and Song.

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