ON CONSTRAINTS AND DIVIDING IN TERNARY HOMOGENEOUS STRUCTURES.

Let ${\cal M}$ be ternary, homogeneous and simple. We prove that if ${\cal M}$ is finitely constrained, then it is supersimple with finite SU-rank and dependence is k -trivial for some k < ω and for finite sets of real elements. Now suppose that, in addition, ${\cal M}$ is supersimple with SU-rank 1. If ${\cal M}$ is finitely constrained then algebraic closure in ${\cal M}$ is trivial. We also find connections between the nature of the constraints of ${\cal M}$ , the nature of the amalgamations allowed by the age of ${\cal M}$ , and the nature of definable equivalence relations. A key method of proof is to "extract" constraints (of ${\cal M}$) from instances of dividing and from definable equivalence relations. Finally, we give new examples, including an uncountable family, of ternary homogeneous supersimple structures of SU-rank 1. [ABSTRACT FROM AUTHOR]