Statistical ensemble inequivalence for flexible polymers under confinement in various geometries

The problem of statistical ensemble inequivalence for single polymers has been the subject of intense research. In a recent publication, we show that even though the force-extension relation of a free Gaussian chain exhibits ensemble equivalence, confinement to half-space due to tethering to a planar substrate induces significant inequivalence [S. Dutta and P. Benetatos, Soft Matter, 2018, 14, 6857-6866]. In this talk, we extend that work to the conformational response to confining forces distributed over surfaces. We analyze in both the Helmholtz and the Gibbs ensemble the pressure-volume equation of state of a chain with free ends in rectangular, spherical, and cylindrical confinement. We especially consider the case of a directed polymer in a cylinder. We also analyze the case of a tethered chain in various geometries. In general, confinement causes significant ensemble inequivalence. Remarkably, we recover ensemble equivalence at the limit of squashing confinement. Our work may be useful to the interpretation of single molecule experiments and caging phenomena.