A Multicritical Point with Infinite Fractal Symmetries
Abstract
Recently a ``Pascal's triangle model" constructed with U(1) rotor degrees of freedom was introduced, and it was shown that (i.) this model possesses an infinite series of fractal symmetries; and (ii.) it is the parent model of a series of Zp fractal models each with its own distinct fractal symmetry. In this work we discuss a multi-critical point of the Pascal's triangle model that is analogous to the Rokhsar-Kivelson (RK) point of the better known quantum dimer model. We demonstrate that the expectation value of the characteristic operator of each fractal symmetry at this multi-critical point decays as a power-law of space, and this multi-critical point is shared by the family of descendent Zp fractal models. Afterwards, we generalize our discussion to a (3+1)d model termed the ``Pascal's tetrahedron model" that has both planar and fractal subsystem symmetries. We also establish a connection between the Pascal's tetrahedron model and the U(1) Haah's code.
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