Compression of inverted lists with methods that support fast intersection operations is an
active research topic. Most compression schemes rely on encoding differences between consecutive
positions with techniques that favor small numbers. In this paper we explore a completely
different alternative: We use Re-Pair compression of those differences. While Re-Pair by itself
offers fast decompression at arbitrary positions in main and secondary memory, we introduce
variants that in addition speed up the operations required for inverted list intersection. We compare
the resulting data structures with several recent proposals under various list intersection
algorithms, to conclude that the Re-Pair based variant offers an excellent space/time tradeoff,
while retaining simplicity of coding.