Truncations of random unitary matrices drawn from Hua-Pickrell distribution

Abstract

Let U be a random unitary matrix drawn from the Hua-Pickrell distribution μU(n+m)(δ) on the unitary group U(n+m). We show that the eigenvalues of the truncated unitary matrix [Ui,j]1≤ i,j≤ n form a determinantal point process Xn(m,δ) on the unit disc D for any δ∈C satisfying Re\,δ>-1/2. We also prove that the limiting point process taken by n∞ of the determinantal point process Xn(m,δ) is always X[m], independent of δ. Here X[m] is the determinantal point process on D with weighted Bergman kernel equation* split K[m](z,w)=1(1-z w)m+1 split equation* with respect to the reference measure dμ[m](z)=mπ(1-|z|)m-1dσ(z), where dσ(z) is the Lebesgue measure on D.

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