Limiting spectral distributions of self-adjoint nonWigner random matrix ensembles with conditionally independent rows조건부 독립 행을 가지는 자기 수반 비 위그너 확률 행렬 앙상블의 극한 스펙트럼 분포
We explore limiting spectral distributions of self-adjoint nonWigner random matrices with conditional independence between entries in a row. We investigate the case where the partial sums of a row converge to a mixture of infinitely divisible distributions. Based on the results in the independent case, we extend the results to show that the spectral measures of the unit vector at a fixed vertex converges to the spectral measure of a mixed form of a Poisson-weighted infinite trees at its root vector. We construct local weak convergence of the associated adjacency operators and upgrade it to strong resolvent convergence, which imlies convergence of the probability measures in the weak topology. The mixture corresponds exactly to the mixture that appears in the limiting distributions of sums of a row.
- Advisors
- Jung, Paulresearcher; 정, 폴researcher
- Description
- 한국과학기술원 :수리과학과,
- Publisher
- 한국과학기술원
- Issue Date
- 2018
- Identifier
- 325007
- Language
- eng
- Description
학위논문(석사) - 한국과학기술원 : 수리과학과, 2018.2,[i, 19 p. :]
- Keywords
random matrix▼aPoisson-weighted infinite tree▼alimiting spectral distribution▼aLevy measure▼ainfinitely divisible distribution▼aconditional independence; 확률 행렬▼a푸아송 웨이트 무한수형도▼a극한 스펙트럼 분포▼a레비 측도▼a무한 분할가능 분포▼a조건부 독립
- Appears in Collection
- MA-Theses_Master(석사논문)
- Files in This Item
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