Water-like fluid in the presence of Lennard–Jones obstacles: predictions of an associative replica Ornstein–Zernike theory

Abstract

What are the properties of water in the presence of a ‘sea’ of inert obstacles? This question arises because biological cells are highly crowded media, and it is of interest to know the properties of water inside them. It also arises for understanding water in confined molecular environments and for mixtures of water with non-polar solutes. We study two-dimensional Mercedes–Benz (MB) water that is freely mobile in a disordered, but fixed, matrix of Lennard–Jones disks. We use the associative replica Ornstein–Zernike equations supplemented by the corresponding hypernetted chain approximation, and we tested the theory using Monte Carlo simulations. We find that the structure of model water is perturbed by the presence of the obstacles. When the density of obstacles is small, the obstacles induce an increased ordering and ‘hydrogen bonding’ of the MB model molecules and increased compressibility, relative to pure fluid, in agreement with previous theoretical and experimental studies. However, interestingly, high obstacle densities reduce MB water structuring, ‘hydrogen bonding’, and compressibility, because the obstacles interfere so extensively with all the possible ways that the fluid can form good ‘hydrogen bonding’ networks.