Glass transition of hard spheres in high dimensions

Abstract

We have investigated analytically and numerically the liquid-glass transition of hard spheres for dimensions d ∞ in the framework of mode-coupling theory. The numerical results for the critical collective and self nonergodicity parameters fc(k;d) and fc(s)(k;d) exhibit non-Gaussian k -dependence even up to d=800. fc(s)(k;d) and fc(k;d) differ for k d1/2, but become identical on a scale k d, which is proven analytically. The critical packing fraction φc(d) d22-d is above the corresponding Kauzmann packing fraction φK(d) derived by a small cage expansion. Its quadratic pre-exponential factor is different from the linear one found earlier. The numerical values for the exponent parameter and therefore the critical exponents a and b depend on d, even for the largest values of d.