Zhenghe Zhang scite author profile

We show that for a class of C 2 quasiperiodic potentials and for any Diophantine frequency, the Lyapunov exponents of the corresponding Schrödinger cocycles are uniformly positive and weak Hölder continuous as function of energies. As a corollary, we also obtain that the corresponding integrated density of states (IDS) is weak Hölder continous. Our approach is of purely dynamical systems, which depends on a detailed analysis of asymptotic stable and unstable directions. We also apply it to more general SL(2, R) cocycles, which in turn can be applied to get uniform positivity and continuity of Lyapuonv exponents around unique nondegenerate extremal points of any smooth potential, and to a certain class of C 2 Szegő cocycles.

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Enhancing the Efficacy of Photodynamic Therapy through a Porphyrin/POSS Alternating Copolymer

Jin

et al. 2018

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Localization for the one-dimensional Anderson model via positivity and large deviations for the Lyapunov exponent

Bucaj

Damanik

Fillman

et al. 2019

Trans. Amer. Math. Soc.

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We provide a complete and self-contained proof of spectral and dynamical localization for the one-dimensional Anderson model, starting from the positivity of the Lyapunov exponent provided by Fürstenberg's theorem. That is, a Schrödinger operator in ℓ 2 (Z) whose potential is given by independent identically distributed (i.i.d.) random variables almost surely has pure point spectrum with exponentially decaying eigenfunctions and its unitary group exhibits exponential off-diagonal decay, uniformly in time. This is achieved by way of a new result: for the Anderson model, one typically has Lyapunov behavior for all generalized eigenfunctions. We also explain how to obtain analogous statements for extended CMV matrices whose Verblunsky coefficients are i.i.d., as well as for half-line analogs of these models.V.B., D.D., V.G., T.

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Singular Density of States Measure for Subshift and Quasi-Periodic Schrödinger Operators

Ávila

Damanik

Zhang³

2014

Commun. Math. Phys.

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Abstract. Simon's subshift conjecture states that for every aperiodic minimal subshift of Verblunsky coefficients, the common essential support of the associated measures has zero Lebesgue measure. We disprove this conjecture in this paper, both in the form stated and in the analogous formulation of it for discrete Schrödinger operators. In addition we prove a weak version of the conjecture in the Schrödinger setting. Namely, under some additional assumptions on the subshift, we show that the density of states measure, a natural measure associated with the operator family and whose topological support is equal to the spectrum, is singular. We also consider one-frequency quasi-periodic Schrödinger operators with continuous sampling functions and show that generically, the density of states measure is singular as well.

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Farm size and agricultural technology progress: Evidence from China

Zhang

et al. 2022

Journal of Rural Studies

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Zhenghe Zhang

Uniform positivity and continuity of Lyapunov exponents for a class of C2 quasiperiodic Schrödinger cocycles

Enhancing the Efficacy of Photodynamic Therapy through a Porphyrin/POSS Alternating Copolymer

Localization for the one-dimensional Anderson model via positivity and large deviations for the Lyapunov exponent

Singular Density of States Measure for Subshift and Quasi-Periodic Schrödinger Operators

Farm size and agricultural technology progress: Evidence from China

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