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- Michael Khasin, Mark I. Dykman
- Physical review letters
- 2009

Population extinction is of central interest for population dynamics. It may occur from a large rare fluctuation. We find that, in contrast to related large-fluctuation effects like noise-inducedâ€¦ (More)

- D. G. Luchinsky, Michael Khasin, Damla Timucin, J. Sass
- 2017

We report a development of probabilistic framework for parameter inference of cryogenic two-phase flow based on fast two-fluid solver. We introduce a concise set of cryogenic correlations and discussâ€¦ (More)

- Mark I. Dykman, Michael Khasin, John J. Portman, Steven W. Shaw
- Physical review letters
- 2010

We study an underdamped oscillator with random frequency jumps. We describe the oscillator spectrum in terms of coupled susceptibilities for different-frequency states. Depending on the parameters,â€¦ (More)

- Michael Khasin, Mark I. Dykman, Baruch Meerson
- Physical review. E, Statistical, nonlinear, andâ€¦
- 2010

We consider optimal vaccination protocol where the vaccine is in short supply. In this case, the endemic state remains dynamically stable; disease extinction happens at random and requires a largeâ€¦ (More)

- Michael Khasin, Baruch Meerson, Evgeniy Khain, Leonard M. Sander
- Physical review letters
- 2012

Many populations in nature are fragmented: they consist of local populations occupying separate patches. A local population is prone to extinction due to the shot noise of birth and death processes.â€¦ (More)

- Michael Khasin, Mark I. Dykman
- Physical review. E, Statistical, nonlinear, andâ€¦
- 2011

We consider control of reaction and population systems by imposing transitions between states with different numbers of particles or individuals. The transitions take place at predetermined instantsâ€¦ (More)

- Michael Khasin, Baruch Meerson, Pavel V. Sasorov
- Physical review. E, Statistical, nonlinear, andâ€¦
- 2010

Extinction of a long-lived isolated stochastic population can be described as an exponentially slow decay of quasistationary probability distribution of the population size. We address extinction ofâ€¦ (More)

- Michael Khasin, Ronnie Kosloff
- Physical review letters
- 2011

A closed quantum system is defined as completely controllable if an arbitrary unitary transformation can be executed using the available controls. In practice, control fields are a source ofâ€¦ (More)

- Michael Khasin, Evgeniy Khain, Leonard M. Sander
- Physical review letters
- 2012

We consider population dynamics on a network of patches, having the same local dynamics, with different population scales (carrying capacities). It is reasonable to assume that if the patches areâ€¦ (More)