How Hard is Counting Triangles in the Streaming Model

Abstract

The problem of (approximately) counting the number of triangles in a graph is one of the basic problems in graph theory. In this paper we study the problem in the streaming model. We study the amount of memory required by a randomized algorithm to solve this problem. In case the algorithm is allowed one pass over the stream, we present a best possible lower bound of (m) for graphs G with m edges on n vertices. If a constant number of passes is allowed, we show a lower bound of (m/T), T the number of triangles. We match, in some sense, this lower bound with a 2-pass O(m/T1/3)-memory algorithm that solves the problem of distinguishing graphs with no triangles from graphs with at least T triangles. We present a new graph parameter (G) -- the triangle density, and conjecture that the space complexity of the triangles problem is (m/(G)). We match this by a second algorithm that solves the distinguishing problem using O(m/(G))-memory.