Abstract
Disclination network in an amorphous solid in continuum approximation is considered. The structure corresponds to a curved space with constant curvature K. It is shown that the lattice is unstable with respect to the transition into a space of constant curvature, i.e. into disordered state. The transition temperature is found and shown that it does not depend on metric at K = const. In addition the perturbation of phonon spectrum and its connection to disclination density are found.
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