Numerical properties of equations involving high-order derivatives of pressure with respect to volumeClaude F. Leibovici and Dan Vladimir Nichita CFL Consultant, Hélioparc, 2 Avenue Pierre Angot, 64053 Pau Cedex, France
E-mail: cfl-consultant@club-internet.fr Received: 18 June 2009 Revised: 20 July 2009 Accepted: 22 July 2009 Abstract: This paper presents some unexpected features related to the solution of equations containing a high-order derivative of pressure with respect to volume equated to zero. For pure components, such equations define, in the pressure-temperature plane, nodal curves similar in shape to mixture spinodal curves. The analysis was made for a general form of two-parameter cubic equations of state and various numerical aspects for the Redlich-Kwong equation of state are exemplified. Keywords: cubic equations of state - high order derivatives of pressure with respect to volume - geometric locus - nodal curves Full paper is available at www.springerlink.com. DOI: 10.2478/s11696-009-0094-7
Chemical Papers 64 (1) 106–113 (2010) |
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