Equivalence of palm measures for determinantal point processes governed by Bergman kernels
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Publication:1626600
DOI10.1007/s00440-017-0803-zzbMath1429.60047arXiv1703.08978OpenAlexW2601190196MaRDI QIDQ1626600
Shilei Fan, Alexander I. Bufetov, Yanqi Qiu
Publication date: 21 November 2018
Published in: Probability Theory and Related Fields (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1703.08978
Bergman kerneldeterminantal point processmonotone couplingconditional measuredeletion and insertion tolerancepalm equivalence
Bergman spaces of functions in several complex variables (32A36) Point processes (e.g., Poisson, Cox, Hawkes processes) (60G55)
Related Items (4)
A survey on determinantal point processes ⋮ Kernels of conditional determinantal measures and the Lyons-Peres completeness conjecture ⋮ The hyperbolic-type point process ⋮ Rigidity of determinantal point processes on the unit disc with sub-Bergman kernels
Cites Work
- The polyanalytic Ginibre ensembles
- Insertion and deletion tolerance of point processes
- Asymptotic expansion of polyanalytic Bergman kernels
- Infinite random matrices \& ergodic decomposition of finite and infinite Hua-Pickrell measures
- Determinantal point processes associated with Hilbert spaces of holomorphic functions
- Absolute continuity and singularity of palm measures of the Ginibre point process
- Determinantal processes and independence
- On Strassen's theorem on stochastic domination
- Random point fields associated with certain Fredholm determinants. I: Fermion, Poisson and Boson point processes.
- Rigidity and tolerance in point processes: Gaussian zeros and Ginibre eigenvalues
- Zeros of the i.i.d. Gaussian power series: a conformally invariant determinantal process
- Complex analysis I: Entire and meromorphic functions, polyanalytic functions and their generalizations. Transl. from the Russian by V. I. Rublinetskij and V. A. Tkachenko
- Determinantal random point fields
- Infinite determinantal measures and the ergodic decomposition of infinite Pickrell measures. I. Construction of infinite determinantal measures
- The coincidence approach to stochastic point processes
- An Introduction to the Theory of Point Processes
- Geometric Analysis of the Bergman Kernel and Metric
- The Existence of Probability Measures with Given Marginals
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