Limits to computation and the underlying physics

Abstract

In principle, black-holes can serve as clocks and computers. Here we show that, according to the laws of quantum mechanics and gravitation, both the speed $\nu$ with which a simple computer (such as a black hole) can process information and the amound of information $I$ that it can process are limited by the input power. In particular, their product is bounded by a universal constant given by $I \nu^2 \lsim t_P^{-2} \sim 10^{86}/sec^2$, where $t_P$ is the Planck time. As a prelude, we show that the maximum time that a simple clock remains accurate is limited by the precision of the clock. All these and related bounds (including the holographic bound) originate from the same physics that governs the quantum fluctuations of space-time. We further show that these physical bounds are realized for black holes. This study also strongly suggests that space-time undergoes much larger quantum fluctuctions than the conventional wisdom claims.