Abstract
We present an exact analytical solution for a one-dimensional zigzag waveguide array with first and second neighbor interactions. It is found that this waveguide system acts as a classical analog to the displaced squeezed number states. The exact solution was compared directly with the numerical solution showing a perfect agreement. The implication of a linear index of refraction changing as a function of the site number is also studied; in this case, we show that the first neighbor interaction strongly influences the periodicity of Bloch oscillations.
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