On the waiting times to repeated hits of cells by particles for the polynomial allocation scheme
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Boris I. Selivanov
und
Vladimir P. Chistyakov
Abstract
We consider random polynomial allocations of particles over N cells. Let τk, k ≥ 1, be the minimal number of trials when k particles hit the occupied cells. For the case N → ∞ the limit distribution of the random variable
Note: Originally published in Diskretnaya Matematika (2019) 31,№2, 143–151 (in Russian).
Funding statement: Research was supported by RAS Program «Modern problems of theoretical mathematics».
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© 2020 Walter de Gruyter GmbH, Berlin/Boston
Artikel in diesem Heft
- Frontmatter
- Group polynomials over rings
- Maximum subclasses in classes of linear automata over finite fields
- Using binary operations to construct a transitive set of block transformations
- Perfect matchings and K1,p-restricted graphs
- On the waiting times to repeated hits of cells by particles for the polynomial allocation scheme
- Semibinomial conditionally nonlinear autoregressive models of discrete random sequences: probabilistic properties and statistical parameter estimation
Artikel in diesem Heft
- Frontmatter
- Group polynomials over rings
- Maximum subclasses in classes of linear automata over finite fields
- Using binary operations to construct a transitive set of block transformations
- Perfect matchings and K1,p-restricted graphs
- On the waiting times to repeated hits of cells by particles for the polynomial allocation scheme
- Semibinomial conditionally nonlinear autoregressive models of discrete random sequences: probabilistic properties and statistical parameter estimation
