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Equation of state for He 4 , including a regular and a scalar part
A new unified equation of state is proposed which describes the P – ρ – T data of He 4 with an error with respect to pressure P of about ± 1 % in the interval of reduced densities from − 1 to + 1 and reduced temperatures from − 0.3 to + 0.3 . The unified equation P ( ρ , T ) , which for the first ti...
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| Published in: | Low temperature physics (Woodbury, N.Y.) N.Y.), 2009-10, Vol.35 (10), p.741-747 |
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| Main Authors: | , , |
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| Language: | English |
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| cites | cdi_FETCH-LOGICAL-s210t-882bdeed24c85ee51daf0b44810c13cdb3744deebd2807c1982e1897e70acaa53 |
| container_end_page | 747 |
| container_issue | 10 |
| container_start_page | 741 |
| container_title | Low temperature physics (Woodbury, N.Y.) |
| container_volume | 35 |
| creator | Bezverkhy, P. P. Martynets, V. G. Matizen, E. V. |
| description | A new unified equation of state is proposed which describes the
P
–
ρ
–
T
data of
He
4
with an error with respect to pressure
P
of about
±
1
%
in the interval of reduced densities from
−
1
to
+
1
and reduced temperatures from
−
0.3
to
+
0.3
. The unified equation
P
(
ρ
,
T
)
, which for the first time is written in explicit functions of density
ρ
and temperature
T
, includes a regular equation of state for approximating the data outside the critical region, a nonparametric scaling equation of state that adequately represents the
P
–
ρ
–
T
data near the critical point of vaporization, and a crossover function that joins the two different equations of state. The crossover function that is proposed is a classical damping function for the density and temperature fluctuations characteristic of the critical region. The regular part of the unified equation consists of a universal seven-constant Kaplun–Meshalkin equation of state and a new, five-constant cubic equation. The unified equation of state obeys the condition that the first and second derivatives of the pressure with respect to the density vanish at the critical point; there are a binodal and a spinodal. |
| doi_str_mv | 10.1063/1.3253391 |
| format | article |
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P
–
ρ
–
T
data of
He
4
with an error with respect to pressure
P
of about
±
1
%
in the interval of reduced densities from
−
1
to
+
1
and reduced temperatures from
−
0.3
to
+
0.3
. The unified equation
P
(
ρ
,
T
)
, which for the first time is written in explicit functions of density
ρ
and temperature
T
, includes a regular equation of state for approximating the data outside the critical region, a nonparametric scaling equation of state that adequately represents the
P
–
ρ
–
T
data near the critical point of vaporization, and a crossover function that joins the two different equations of state. The crossover function that is proposed is a classical damping function for the density and temperature fluctuations characteristic of the critical region. The regular part of the unified equation consists of a universal seven-constant Kaplun–Meshalkin equation of state and a new, five-constant cubic equation. The unified equation of state obeys the condition that the first and second derivatives of the pressure with respect to the density vanish at the critical point; there are a binodal and a spinodal.</description><identifier>ISSN: 1063-777X</identifier><identifier>EISSN: 1090-6517</identifier><identifier>DOI: 10.1063/1.3253391</identifier><identifier>CODEN: LTPHEG</identifier><language>eng</language><publisher>American Institute of Physics</publisher><ispartof>Low temperature physics (Woodbury, N.Y.), 2009-10, Vol.35 (10), p.741-747</ispartof><rights>American Institute of Physics</rights><rights>2009 American Institute of Physics</rights><lds50>peer_reviewed</lds50><woscitedreferencessubscribed>false</woscitedreferencessubscribed><cites>FETCH-LOGICAL-s210t-882bdeed24c85ee51daf0b44810c13cdb3744deebd2807c1982e1897e70acaa53</cites></display><links><openurl>$$Topenurl_article</openurl><openurlfulltext>$$Topenurlfull_article</openurlfulltext><thumbnail>$$Tsyndetics_thumb_exl</thumbnail><link.rule.ids>314,780,784,27924,27925</link.rule.ids></links><search><creatorcontrib>Bezverkhy, P. P.</creatorcontrib><creatorcontrib>Martynets, V. G.</creatorcontrib><creatorcontrib>Matizen, E. V.</creatorcontrib><title>Equation of state for He 4 , including a regular and a scalar part</title><title>Low temperature physics (Woodbury, N.Y.)</title><description>A new unified equation of state is proposed which describes the
P
–
ρ
–
T
data of
He
4
with an error with respect to pressure
P
of about
±
1
%
in the interval of reduced densities from
−
1
to
+
1
and reduced temperatures from
−
0.3
to
+
0.3
. The unified equation
P
(
ρ
,
T
)
, which for the first time is written in explicit functions of density
ρ
and temperature
T
, includes a regular equation of state for approximating the data outside the critical region, a nonparametric scaling equation of state that adequately represents the
P
–
ρ
–
T
data near the critical point of vaporization, and a crossover function that joins the two different equations of state. The crossover function that is proposed is a classical damping function for the density and temperature fluctuations characteristic of the critical region. The regular part of the unified equation consists of a universal seven-constant Kaplun–Meshalkin equation of state and a new, five-constant cubic equation. The unified equation of state obeys the condition that the first and second derivatives of the pressure with respect to the density vanish at the critical point; there are a binodal and a spinodal.</description><issn>1063-777X</issn><issn>1090-6517</issn><fulltext>true</fulltext><rsrctype>article</rsrctype><creationdate>2009</creationdate><recordtype>article</recordtype><sourceid/><recordid>eNp9j09Lw0AQxRdRsFYPfoM9i6k72SS7uQhaqhUKXhS8LZP9UyI1ibsbwW_fpFY8iJ5mHvPmzfwIOQc2A1bwK5jxNOe8hAMyAVaypMhBHI59wRMhxMsxOQnhlTEYpuWE3C7ee4x129DW0RAxWupaT5eWZvSS1o3e9KZu1hSpt-t-g55iYwYVNI6iQx9PyZHDTbBn-zolz3eLp_kyWT3eP8xvVklIgcVEyrQy1po00zK3NgeDjlVZJoFp4NpUXGTZYKhMKpnQUMrUgiyFFQw1Ys6n5PorN-g67n5Wna_f0H8qYGoEVKD29N9UqnVqR6VcOwRc_BXw0fqfZdUZ95_51zW-BeODb7g</recordid><startdate>200910</startdate><enddate>200910</enddate><creator>Bezverkhy, P. P.</creator><creator>Martynets, V. G.</creator><creator>Matizen, E. V.</creator><general>American Institute of Physics</general><scope/></search><sort><creationdate>200910</creationdate><title>Equation of state for He 4 , including a regular and a scalar part</title><author>Bezverkhy, P. P. ; Martynets, V. G. ; Matizen, E. V.</author></sort><facets><frbrtype>5</frbrtype><frbrgroupid>cdi_FETCH-LOGICAL-s210t-882bdeed24c85ee51daf0b44810c13cdb3744deebd2807c1982e1897e70acaa53</frbrgroupid><rsrctype>articles</rsrctype><prefilter>articles</prefilter><language>eng</language><creationdate>2009</creationdate><toplevel>peer_reviewed</toplevel><toplevel>online_resources</toplevel><creatorcontrib>Bezverkhy, P. P.</creatorcontrib><creatorcontrib>Martynets, V. G.</creatorcontrib><creatorcontrib>Matizen, E. V.</creatorcontrib><jtitle>Low temperature physics (Woodbury, N.Y.)</jtitle></facets><delivery><delcategory>Remote Search Resource</delcategory><fulltext>fulltext</fulltext></delivery><addata><au>Bezverkhy, P. P.</au><au>Martynets, V. G.</au><au>Matizen, E. V.</au><format>journal</format><genre>article</genre><ristype>JOUR</ristype><atitle>Equation of state for He 4 , including a regular and a scalar part</atitle><jtitle>Low temperature physics (Woodbury, N.Y.)</jtitle><date>2009-10</date><risdate>2009</risdate><volume>35</volume><issue>10</issue><spage>741</spage><epage>747</epage><pages>741-747</pages><issn>1063-777X</issn><eissn>1090-6517</eissn><coden>LTPHEG</coden><abstract>A new unified equation of state is proposed which describes the
P
–
ρ
–
T
data of
He
4
with an error with respect to pressure
P
of about
±
1
%
in the interval of reduced densities from
−
1
to
+
1
and reduced temperatures from
−
0.3
to
+
0.3
. The unified equation
P
(
ρ
,
T
)
, which for the first time is written in explicit functions of density
ρ
and temperature
T
, includes a regular equation of state for approximating the data outside the critical region, a nonparametric scaling equation of state that adequately represents the
P
–
ρ
–
T
data near the critical point of vaporization, and a crossover function that joins the two different equations of state. The crossover function that is proposed is a classical damping function for the density and temperature fluctuations characteristic of the critical region. The regular part of the unified equation consists of a universal seven-constant Kaplun–Meshalkin equation of state and a new, five-constant cubic equation. The unified equation of state obeys the condition that the first and second derivatives of the pressure with respect to the density vanish at the critical point; there are a binodal and a spinodal.</abstract><pub>American Institute of Physics</pub><doi>10.1063/1.3253391</doi><tpages>7</tpages></addata></record> |
| fulltext | fulltext |
| identifier | ISSN: 1063-777X |
| ispartof | Low temperature physics (Woodbury, N.Y.), 2009-10, Vol.35 (10), p.741-747 |
| issn | 1063-777X 1090-6517 |
| language | eng |
| recordid | cdi_scitation_primary_10_1063_1_3253391 |
| source | American Institute of Physics:Jisc Collections:Transitional Journals Agreement 2021-23 (Reading list) |
| title | Equation of state for He 4 , including a regular and a scalar part |
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