POSSIBLE TRICRITICAL SITUATIONS IN LIQUIDS: AN ANALOGYPAPOULAR M; LAHEURTE JP.1973; SOLID STATE COMMUNIC.; G.B.; DA. 1973; VOL. 12; NO 1; PP. 71-73; ABS. FR.; BIBL. 9 REF.Serial Issue

Critical dynamics, Lifshitz tricriticality, and supersymmetry: the Ising model on the hcp latticeDOMANY, E; GUBERNATIS, J. E.Physical review. B, Condensed matter. 1985, Vol 32, Num 5, pp 3354-3357, issn 0163-1829Article

Collapse transition of branched polymers with a tunable number of loopsCHANG, I. S; SHAPIR, Y.Physical review. B, Condensed matter. 1988, Vol 38, Num 10, pp 6736-6740, issn 0163-1829Article

Modulated structures of an ising model with competing nearest-neighbour interactionsDE OLIVEIRA, M. J; SALINAS, S. R.Journal of physics. A, mathematical and general. 1985, Vol 18, Num 18, pp L1157-L1161, issn 0305-4470Article

Correlated effective field method in the location of the Ising model tricritical pointFRANK, B; DANINO, M.Solid state communications. 1985, Vol 56, Num 7, pp 643-644, issn 0038-1098Article

Novel Lifshitz tricritical point and critical dynamicsAHARONY, A; DOMANY, E; HORNREICH, R. M et al.Physical review. B, Condensed matter. 1985, Vol 32, Num 5, pp 3358-3360, issn 0163-1829Article

Finite-size scaling at an ising tricritical pointBEALE, P. D.Journal of physics. A, mathematical and general. 1984, Vol 17, Num 6, pp L335-L339, issn 0305-4470Article

Order parameter for tricritical phenomenaPEGG, I. L; KNOBLER, C. M; SCOTT, R. L et al.Journal of physical chemistry (1952). 1983, Vol 87, Num 15, pp 2866-2868, issn 0022-3654Article

A TRICRITICAL MODEL WITH AN EXPERIMENTALLY ACCESSIBLE ORDERING FIELD.KHAJEHPOUR MRH; KROMHOUT RA; YUNG LI WANG et al.1975; J. PHYS. A; G.B.; DA. 1975; VOL. 8; NO 6; PP. 913-924; BIBL. 11 REF.Article

QUESTION OF A TRICRITICAL POINT IN A COMPRESSIBLE ISING MODEL.FRIEDMAN Z; GUNTHER L.1975; PHYS. REV., B; U.S.A.; DA. 1975; VOL. 12; NO 11; PP. 5123-5127; BIBL. 19 REF.Article

UNIVERSALITY OF MAGNETIC TRICRITICAL POINTS.FISHER ME; NELSON DR.1975; PHYS. REV., B; U.S.A.; DA. 1975; VOL. 12; NO 1; PP. 263-266; BIBL. 12 REF.Article

TRICRITICAL POINTS FOR COMPETING INTERACTIONS.HULLER A.1974; Z. PHYS.; DTSCH.; DA. 1974; VOL. 270; NO 4; PP. 343-350; BIBL. 21 REF.Article

AN EXACTLY SOLUBLE MODEL WITH TRICRITICAL POINTS FOR STRUCTURAL PHASE TRANSITIONS.SARBACH S; SCHNEIDER T.1975; Z. PHYS. B; DTSCH.; DA. 1975; VOL. 20; NO 4; PP. 399-403; BIBL. 11 REF.Article

THREE-STATE POTTS MODEL AND ANOMALOUS TRICRITICAL POINTSSTRALEY JP; FISHER ME.1973; J. PHYS. A; G.B.; DA. 1973; VOL. 6; NO 9; PP. 1310-1326; BIBL. 15 REF.Serial Issue

Low-temperature phase transitions in a random-field Ising modelSAXENA, V. K.Physical review. B, Condensed matter. 1984, Vol 30, Num 7, pp 4034-4036, issn 0163-1829Article

Reaction-field caclculation for the quantum Potts modelDEKEYSER, R; MARITAN, A; STELLA, A. L et al.Journal of physics. C. Solid state physics. 1984, Vol 17, Num 36, pp 6811-6818, issn 0022-3719Article

EQUIVALENCE OF TWO EXACTLY SOLUBLE MODELS FOR TRICRITICAL POINTS.SARBACH S; SCHNEIDER T.1976; PHYS. REV., B; U.S.A.; DA. 1976; VOL. 13; NO 1; PP. 464-465; BIBL. 5 REF.Article

RENORMALIZATION-GROUP THEORY AND CALCULATIONS OF TRICRITICAL BEHAVIOR.NIENHUIS B; NAUENBERG M.1976; PHYS. REV., B; U.S.A.; DA. 1976; VOL. 13; NO 5; PP. 2021-2027; BIBL. 28 REF.Article

TRICRITICAL, DYNAMICAL OF MULTICOMPONENT FLUIDS.KAWASAKI K.1975; J. PHYS. A; G.B.; DA. 1975; VOL. 8; NO 2; PP. 262-271; BIBL. 20 REF.Article

SCALING EQUATION OF STATE FOR THERMODYNAMIC SYSTEMS HAVING A TRICRITICAL POINTKORTMAN PJ.1972; PHYS. REV. LETTERS; U.S.A.; DA. 1972; VOL. 29; NO 21; PP. 1449-1452; BIBL. 24 REF.Serial Issue

Multicritical behaviour in binary fluid convectionSCHOPF, W; ZIMMERMANN, W.Europhysics letters (Print). 1989, Vol 8, Num 1, pp 41-46, issn 0295-5075Article

The estimation of the tricritical point of the interacting hard squares from the low-temperature series expansionsAKSENENKO, E. V.Journal of physics. A, mathematical and general. 1984, Vol 17, Num 11, pp L593-L595, issn 0305-4470Article

Random-field ising model with a zero temperature multicritical pointEVANGELISTA, L. R; SAXENA, V. K.Physica status solidi. B. Basic research. 1984, Vol 126, Num 1, pp K29-K31, issn 0370-1972Article

Hamiltonian studies of the Blume-Emery-Griffiths modelALCARAZ, F. C; DRUGOWICH DE FELICIO, J. R; KOBERLE, R et al.Physical review. B, Condensed matter. 1985, Vol 32, Num 11, pp 7469-7475, issn 0163-1829Article

On the tricritical Lifshitz behaviourTONCHEV, N. S; UZUNOV, D. I.Physica. A. 1985, Vol 134, Num 1, pp 265-273, issn 0378-4371Article