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@ARTICLE{Schwarz:11844,
      author       = {Schwarz, U. S. and Gompper, G.},
      title        = {{S}tability of bicontinuous cubic phases in ternary
                      amphiphilic systems with spontaneous curvature},
      journal      = {The journal of chemical physics},
      volume       = {112},
      issn         = {0021-9606},
      address      = {Melville, NY},
      publisher    = {American Institute of Physics},
      reportid     = {PreJuSER-11844},
      pages        = {3792 - 3802},
      year         = {2000},
      note         = {Record converted from VDB: 12.11.2012},
      abstract     = {We study the phase behavior of ternary amphiphilic systems
                      in the framework of a curvature model with nonvanishing
                      spontaneous curvature. The amphiphilic monolayers can
                      arrange in different ways to form micellar, hexagonal,
                      lamellar, and various bicontinuous cubic phases. For the
                      latter case we consider both single structures (one
                      monolayer) and double structures (two monolayers). Their
                      interfaces are modeled by the triply periodic surfaces of
                      constant mean curvature of the families G, D, P, C(P), I-WP,
                      and F-RD. The stability of the different bicontinuous cubic
                      phases can be explained by the way in which their universal
                      geometrical properties conspire with the concentration
                      constraints. For vanishing saddle-splay modulus <(kappa)over
                      bar>, almost every phase considered has some region of
                      stability in the Gibbs triangle. Although bicontinuous cubic
                      phases are suppressed by sufficiently negative values of the
                      saddle-splay modulus <(kappa)over bar>, we find that they
                      can exist for considerably lower values than obtained
                      previously. The most stable bicontinuous cubic phases with
                      decreasing <(kappa)over bar>< 0 are the single and double
                      gyroid structures since they combine favorable topological
                      properties with extreme volume fractions. (C) 2000 American
                      Institute of Physics. [S0021-9606(00)70306-0].},
      keywords     = {J (WoSType)},
      cin          = {IFF},
      ddc          = {540},
      cid          = {I:(DE-Juel1)VDB241},
      pnm          = {Polymere, Membranen und komplexe Flüssigkeiten},
      pid          = {G:(DE-Juel1)FUEK53},
      shelfmark    = {Physics, Atomic, Molecular $\&$ Chemical},
      typ          = {PUB:(DE-HGF)16},
      UT           = {WOS:000085345300037},
      url          = {https://juser.fz-juelich.de/record/11844},
}