Theoretical Analysis of Liquid–Ice Interaction in the Unsaturated Environment with Application to the Problem of Homogeneous Mixing
The process of ice–liquid water interaction in the unsaturated environment is explored both analytically and with the help of a numerical simulation. Ice–liquid water interaction via the condensation–evaporation mechanism is considered in relation to the problem of homogeneous mixing in an unmovable...
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| Veröffentlicht in: | Journal of the atmospheric sciences 2018-04, Vol.75 (4), p.1045-1062 |
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| creator | Pinsky, M. Khain, A. Korolev, A. |
| description | The process of ice–liquid water interaction in the unsaturated environment is explored both analytically and with the help of a numerical simulation. Ice–liquid water interaction via the condensation–evaporation mechanism is considered in relation to the problem of homogeneous mixing in an unmovable air volume. The process is separated into three stages: the homogenization stage, during which the rapid alignment of thermodynamic and microphysical parameters in the mixing volume takes place; the glaciation stage, during which the liquid droplets evaporate; and the ice stage, which leads to attaining a thermodynamic equilibrium. Depending on the initial temperature, humidity, and mixing ratios of liquid water and of ice water, the third stage may result in two outcomes: existence of ice particles under zero supersaturation with respect to ice or a complete disappearance of ice particles.
Three characteristic times are associated with the microphysical stages: the phase relaxation time associated with droplets, the glaciation time determined by the Wegener–Bergeron–Findeisen process, and the phase relaxation time associated with ice. Since the duration of the second and third microphysical stages may be of the same order as the homogenization time or even longer, the homogeneous mixing scenario is more probable in mixed-phase clouds than in liquid clouds.
It is shown that mixing of a mixed-phase cloud with a dry environment accelerates cloud glaciation, leading to a decrease in the glaciation time by more than 2 times. The conditions of fast ice particles’ disappearance due to sublimation are analyzed as well. |
| doi_str_mv | 10.1175/JAS-D-17-0228.1 |
| format | Article |
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Three characteristic times are associated with the microphysical stages: the phase relaxation time associated with droplets, the glaciation time determined by the Wegener–Bergeron–Findeisen process, and the phase relaxation time associated with ice. Since the duration of the second and third microphysical stages may be of the same order as the homogenization time or even longer, the homogeneous mixing scenario is more probable in mixed-phase clouds than in liquid clouds.
It is shown that mixing of a mixed-phase cloud with a dry environment accelerates cloud glaciation, leading to a decrease in the glaciation time by more than 2 times. The conditions of fast ice particles’ disappearance due to sublimation are analyzed as well.</description><identifier>ISSN: 0022-4928</identifier><identifier>EISSN: 1520-0469</identifier><identifier>DOI: 10.1175/JAS-D-17-0228.1</identifier><language>eng</language><publisher>Boston: American Meteorological Society</publisher><subject>Atmospheric sciences ; Climate change ; Cloud glaciation ; Clouds ; Computer simulation ; Condensation ; Droplets ; Duration ; ENVIRONMENTAL SCIENCES ; Evaporation ; Fast ice ; Glaciation ; Glaciers ; Glaciology ; Homogenization ; Humidity ; Ice ; Ice particles ; Mathematical models ; Meteorology & Atmospheric Sciences ; Mixing ratio ; Numerical simulations ; Precipitation ; Relaxation time ; Remote sensing ; Sublimation ; Supersaturation ; Theoretical analysis ; Thermodynamic equilibrium ; Water</subject><ispartof>Journal of the atmospheric sciences, 2018-04, Vol.75 (4), p.1045-1062</ispartof><rights>Copyright American Meteorological Society 2018</rights><lds50>peer_reviewed</lds50><oa>free_for_read</oa><woscitedreferencessubscribed>false</woscitedreferencessubscribed><citedby>FETCH-LOGICAL-c337t-6e91bb9dcfd6cf41607d905be46042ce9aa7a2d999fc01f36b9cb8358c783ccd3</citedby><cites>FETCH-LOGICAL-c337t-6e91bb9dcfd6cf41607d905be46042ce9aa7a2d999fc01f36b9cb8358c783ccd3</cites></display><links><openurl>$$Topenurl_article</openurl><openurlfulltext>$$Topenurlfull_article</openurlfulltext><thumbnail>$$Tsyndetics_thumb_exl</thumbnail><link.rule.ids>230,314,776,780,881,3667,27903,27904</link.rule.ids><backlink>$$Uhttps://www.osti.gov/biblio/1430402$$D View this record in Osti.gov$$Hfree_for_read</backlink></links><search><creatorcontrib>Pinsky, M.</creatorcontrib><creatorcontrib>Khain, A.</creatorcontrib><creatorcontrib>Korolev, A.</creatorcontrib><creatorcontrib>Hebrew Univ. of Jerusalem (Israel)</creatorcontrib><title>Theoretical Analysis of Liquid–Ice Interaction in the Unsaturated Environment with Application to the Problem of Homogeneous Mixing</title><title>Journal of the atmospheric sciences</title><description>The process of ice–liquid water interaction in the unsaturated environment is explored both analytically and with the help of a numerical simulation. Ice–liquid water interaction via the condensation–evaporation mechanism is considered in relation to the problem of homogeneous mixing in an unmovable air volume. The process is separated into three stages: the homogenization stage, during which the rapid alignment of thermodynamic and microphysical parameters in the mixing volume takes place; the glaciation stage, during which the liquid droplets evaporate; and the ice stage, which leads to attaining a thermodynamic equilibrium. Depending on the initial temperature, humidity, and mixing ratios of liquid water and of ice water, the third stage may result in two outcomes: existence of ice particles under zero supersaturation with respect to ice or a complete disappearance of ice particles.
Three characteristic times are associated with the microphysical stages: the phase relaxation time associated with droplets, the glaciation time determined by the Wegener–Bergeron–Findeisen process, and the phase relaxation time associated with ice. Since the duration of the second and third microphysical stages may be of the same order as the homogenization time or even longer, the homogeneous mixing scenario is more probable in mixed-phase clouds than in liquid clouds.
It is shown that mixing of a mixed-phase cloud with a dry environment accelerates cloud glaciation, leading to a decrease in the glaciation time by more than 2 times. The conditions of fast ice particles’ disappearance due to sublimation are analyzed as well.</description><subject>Atmospheric sciences</subject><subject>Climate change</subject><subject>Cloud glaciation</subject><subject>Clouds</subject><subject>Computer simulation</subject><subject>Condensation</subject><subject>Droplets</subject><subject>Duration</subject><subject>ENVIRONMENTAL SCIENCES</subject><subject>Evaporation</subject><subject>Fast ice</subject><subject>Glaciation</subject><subject>Glaciers</subject><subject>Glaciology</subject><subject>Homogenization</subject><subject>Humidity</subject><subject>Ice</subject><subject>Ice particles</subject><subject>Mathematical models</subject><subject>Meteorology & Atmospheric Sciences</subject><subject>Mixing ratio</subject><subject>Numerical simulations</subject><subject>Precipitation</subject><subject>Relaxation time</subject><subject>Remote sensing</subject><subject>Sublimation</subject><subject>Supersaturation</subject><subject>Theoretical analysis</subject><subject>Thermodynamic 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Unsaturated Environment with Application to the Problem of Homogeneous Mixing</atitle><jtitle>Journal of the atmospheric sciences</jtitle><date>2018-04-01</date><risdate>2018</risdate><volume>75</volume><issue>4</issue><spage>1045</spage><epage>1062</epage><pages>1045-1062</pages><issn>0022-4928</issn><eissn>1520-0469</eissn><abstract>The process of ice–liquid water interaction in the unsaturated environment is explored both analytically and with the help of a numerical simulation. Ice–liquid water interaction via the condensation–evaporation mechanism is considered in relation to the problem of homogeneous mixing in an unmovable air volume. The process is separated into three stages: the homogenization stage, during which the rapid alignment of thermodynamic and microphysical parameters in the mixing volume takes place; the glaciation stage, during which the liquid droplets evaporate; and the ice stage, which leads to attaining a thermodynamic equilibrium. Depending on the initial temperature, humidity, and mixing ratios of liquid water and of ice water, the third stage may result in two outcomes: existence of ice particles under zero supersaturation with respect to ice or a complete disappearance of ice particles.
Three characteristic times are associated with the microphysical stages: the phase relaxation time associated with droplets, the glaciation time determined by the Wegener–Bergeron–Findeisen process, and the phase relaxation time associated with ice. Since the duration of the second and third microphysical stages may be of the same order as the homogenization time or even longer, the homogeneous mixing scenario is more probable in mixed-phase clouds than in liquid clouds.
It is shown that mixing of a mixed-phase cloud with a dry environment accelerates cloud glaciation, leading to a decrease in the glaciation time by more than 2 times. The conditions of fast ice particles’ disappearance due to sublimation are analyzed as well.</abstract><cop>Boston</cop><pub>American Meteorological Society</pub><doi>10.1175/JAS-D-17-0228.1</doi><tpages>18</tpages><oa>free_for_read</oa></addata></record> |
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| ispartof | Journal of the atmospheric sciences, 2018-04, Vol.75 (4), p.1045-1062 |
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| source | American Meteorological Society; EZB-FREE-00999 freely available EZB journals; Alma/SFX Local Collection |
| subjects | Atmospheric sciences Climate change Cloud glaciation Clouds Computer simulation Condensation Droplets Duration ENVIRONMENTAL SCIENCES Evaporation Fast ice Glaciation Glaciers Glaciology Homogenization Humidity Ice Ice particles Mathematical models Meteorology & Atmospheric Sciences Mixing ratio Numerical simulations Precipitation Relaxation time Remote sensing Sublimation Supersaturation Theoretical analysis Thermodynamic equilibrium Water |
| title | Theoretical Analysis of Liquid–Ice Interaction in the Unsaturated Environment with Application to the Problem of Homogeneous Mixing |
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