{"record_type":"pith_number_record","schema_url":"https://pith.science/schemas/pith-number/v1.json","pith_number":"pith:2012:BHUQ2EYYUVQJ4BBB6FAV2VO37H","short_pith_number":"pith:BHUQ2EYY","schema_version":"1.0","canonical_sha256":"09e90d1318a5609e0421f1415d55dbf9eeacfb30ac5fd2252334707b158d6ce3","source":{"kind":"arxiv","id":"1208.5953","version":3},"attestation_state":"computed","paper":{"title":"Convergence of the empirical spectral distribution function of Beta matrices","license":"http://arxiv.org/licenses/nonexclusive-distrib/1.0/","headline":"","cross_cats":[],"primary_cat":"math.PR","authors_text":"Guangming Pan, Jiang Hu, Wang Zhou, Zhidong Bai","submitted_at":"2012-08-29T16:04:47Z","abstract_excerpt":"Let $\\mathbf{B}_n=\\mathbf {S}_n(\\mathbf {S}_n+\\alpha_n\\mathbf {T}_N)^{-1}$, where $\\mathbf {S}_n$ and $\\mathbf {T}_N$ are two independent sample covariance matrices with dimension $p$ and sample sizes $n$ and $N$, respectively. This is the so-called Beta matrix. In this paper, we focus on the limiting spectral distribution function and the central limit theorem of linear spectral statistics of $\\mathbf {B}_n$. Especially, we do not require $\\mathbf {S}_n$ or $\\mathbf {T}_N$ to be invertible. Namely, we can deal with the case where $p>\\max\\{n,N\\}$ and $p\\max\\{n,N\\}$ and $p