Disorder to Order Transition in 1D non-reciprocal Cahn-Hilliard Model
Abstract
We present the phenomenology of the one dimensional non-reciprocal Cahn Hilliard model for varying non-reciprocity (α) and different boundary conditions. At small α, a perturbed uniform state evolves to a defect laden configuration that lacks global polar order. Defects are the sources and sinks of travelling waves. For a given α, defects with a unique wave number that increases monotonically with α are selected. A critical threshold αc marks the onset of a transition to states with finite global polar order. For periodic boundary conditions, above αc, the system shows travelling waves that are completely ordered. In contrast, travelling waves are incompatible with the Neumann and Dirichlet boundary conditions. Instead, for α αc, we find fluctuating domains that show intermittent polar order and at large α, the system partitions into two domains with opposite polar order.
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