We study one-dimensional hybrid quantum circuits perturbed by quenched quasiperiodic (QP) modulations across the measurement-induced phase transition (MIPT). Considering non-Pisot QP structures, characterized by unbounded fluctuations, allows us to tune the wandering exponent $\beta$ to exceed the Luck bound $\nu \ge 1/(1-\beta)$ for the stability of the MIPT where $\nu\cong 4/3$. Via large-scale numerical simulations of random Clifford circuits interleaved with local projective measurements, we find that sufficiently large QP structural fluctuations destabilize the MIPT and induce a flow to a broad family of critical dynamical phase transitions of the infinite QP type that is governed by the wandering exponent, $\beta$. We numerically dete...
Measurement-induced phase transitions (MIPT) have attracted increasing attention due to the rich phe...
We investigate the structure of many-body wave functions of 1D quantum circuits with local measureme...
We develop a strong-disorder renormalization group to study quantum phase transitions with continuou...
We consider a model of monitored quantum dynamics with quenched spatial randomness: specifically, ra...
In this paper we continue to explore "hybrid" quantum circuit models in one-dimension with both unit...
Recently, a new class of nonequilibrium quantum phase transitions was identified in random quantum c...
Symmetries (and their spontaneous rupturing) can be used to protect and engender novel quantum phase...
Monitored quantum circuits (MRCs) exhibit a measurement-induced phase transition between area-law an...
The dynamical quantum phase transition is characterized by the emergence of nonanalytic behaviors in...
We study the statistical properties of a single free quantum particle evolving coherently on a discr...
In this thesis we study the effects of different types of disorder and quasiperiodic modulations on ...
We demonstrate that in a class of disordered quantum systems the dynamical partition function is not...
Quasiperiodic system is an intermediate state between periodic and disordered systems with unique de...
We uncover a novel dynamical quantum phase transition, using random matrix theory and its associated...
The central philosophy of statistical mechanics (stat-mech) and random-matrix theory of complex syst...
Measurement-induced phase transitions (MIPT) have attracted increasing attention due to the rich phe...
We investigate the structure of many-body wave functions of 1D quantum circuits with local measureme...
We develop a strong-disorder renormalization group to study quantum phase transitions with continuou...
We consider a model of monitored quantum dynamics with quenched spatial randomness: specifically, ra...
In this paper we continue to explore "hybrid" quantum circuit models in one-dimension with both unit...
Recently, a new class of nonequilibrium quantum phase transitions was identified in random quantum c...
Symmetries (and their spontaneous rupturing) can be used to protect and engender novel quantum phase...
Monitored quantum circuits (MRCs) exhibit a measurement-induced phase transition between area-law an...
The dynamical quantum phase transition is characterized by the emergence of nonanalytic behaviors in...
We study the statistical properties of a single free quantum particle evolving coherently on a discr...
In this thesis we study the effects of different types of disorder and quasiperiodic modulations on ...
We demonstrate that in a class of disordered quantum systems the dynamical partition function is not...
Quasiperiodic system is an intermediate state between periodic and disordered systems with unique de...
We uncover a novel dynamical quantum phase transition, using random matrix theory and its associated...
The central philosophy of statistical mechanics (stat-mech) and random-matrix theory of complex syst...
Measurement-induced phase transitions (MIPT) have attracted increasing attention due to the rich phe...
We investigate the structure of many-body wave functions of 1D quantum circuits with local measureme...
We develop a strong-disorder renormalization group to study quantum phase transitions with continuou...
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