paper
Quantitative spectral gap for thin groups of hyperbolic isometries
Michael Magee
Quantitative spectral gap for thin groups of hyperbolic isometries
Michael Magee
paper2011-12-09English
quantitative financearxiv
Description
Let $Λ$ be a subgroup of an arithmetic lattice in SO(n+1,1). The quotient $\mathbb{H}^{n+1} / Λ$ has a natural family of congruence covers corresponding to primes in some ring of integers. We establish a super-strong approximation result for Zariski-dense $Λ$ with some additional regularity and thickness properties. Concretely, this asserts a quantitative spectral gap for the Laplacian operators on the congruence covers. This generalizes results of Sarnak and Xue (1991) and Gamburd (2002).
Similar Books
paper
Quantitative mode stability for the wave equation on the Kerr-Newman spacetime
Damon Civin
Quantitative mode stability for the wave equation on the Kerr-Newman spacetime
paper
Risk-Aware Objective-Based Forecasting in Inertia Management
Haipeng Zhang, Ran Li, Yan Chen, Zhongda Chu, Mingyang Sun
Risk-Aware Objective-Based Forecasting in Inertia Management
paper
Chainalysis: Geography of Cryptocurrency 2023
Chainalysis
Chainalysis: Geography of Cryptocurrency 2023
paper
Periodicity in Cryptocurrency Volatility and Liquidity
Peter Reinhard Hansen, Chan Kim, Wade Kimbrough
Periodicity in Cryptocurrency Volatility and Liquidity
paper
Impact of Geometric Uncertainty on the Computation of Abdominal Aortic Aneurysm Wall Strain
Saeideh Sekhavat, Mostafa Jamshidian, Adam Wittek, Karol Miller
Impact of Geometric Uncertainty on the Computation of Abdominal Aortic Aneurysm Wall Strain
paper
Simulation-based Bayesian inference with ameliorative learned summary statistics -- Part I
Getachew K. Befekadu
Simulation-based Bayesian inference with ameliorative learned summary statistics -- Part I