TY - JOUR
T1 - Universality limits in the bulk for varying measures
AU - Levin, Eli
AU - Lubinsky, Doron S.
N1 - Funding Information:
Research supported by NSF grant DMS0400446 and US-Israel BSF grant 2004353. Corresponding author. E-mail addresses: [email protected] (E. Levin), [email protected] (D.S. Lubinsky).
PY - 2008/10/20
Y1 - 2008/10/20
N2 - Universality limits are a central topic in the theory of random matrices. We establish universality limits in the bulk of the spectrum for varying measures, using the theory of entire functions of exponential type. In particular, we consider measures that are of the form Wn2 n (x) d x in the region where universality is desired. Wn does not need to be analytic, nor possess more than one derivative-and then only in the region where universality is desired. We deduce universality in the bulk for a large class of weights of the form W2 n (x) d x, for example, when W = e- Q where Q is convex and Q′ satisfies a Lipschitz condition of some positive order. We also deduce universality for a class of fixed exponential weights on a real interval.
AB - Universality limits are a central topic in the theory of random matrices. We establish universality limits in the bulk of the spectrum for varying measures, using the theory of entire functions of exponential type. In particular, we consider measures that are of the form Wn2 n (x) d x in the region where universality is desired. Wn does not need to be analytic, nor possess more than one derivative-and then only in the region where universality is desired. We deduce universality in the bulk for a large class of weights of the form W2 n (x) d x, for example, when W = e- Q where Q is convex and Q′ satisfies a Lipschitz condition of some positive order. We also deduce universality for a class of fixed exponential weights on a real interval.
KW - Orthogonal polynomials potential theory with external fields
KW - Random matrices
KW - Universality limits
UR - http://www.scopus.com/inward/record.url?scp=50349090048&partnerID=8YFLogxK
U2 - 10.1016/j.aim.2008.06.010
DO - 10.1016/j.aim.2008.06.010
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AN - SCOPUS:50349090048
SN - 0001-8708
VL - 219
SP - 743
EP - 779
JO - Advances in Mathematics
JF - Advances in Mathematics
IS - 3
ER -