Built on the foundations laid by Peirce, Schroder, and others in the 19th century, the modem development of relation algebras started with the work of Tarski and his colleagues [21, 22]. They showed that relation algebras can capture strong first-order theories like ZFC, and so their equational theory is undecidable. The less expressive class WA of weakly associative relation algebras was introduced by Maddux [7]. Nemeti [16] showed that WA's have a decidable universal theory. There has been extensive research on increasing the expressive power of WA by adding new operations [1, 4, 11, 13, 20]. Extensions of this kind usually also have decidable universal theories. Here we give an example - extending WA's with set-theoretic projection elements - where this is not the case. These "logical" connectives are set-theoretic counterparts of the axiomatic quasi-projections that have been investigated in the representation theory of relation algebras [22, 6, 19]. We prove that the quasi-equational theory of the extended class PWA is not recursively enumerable. By adding the difference operator D one can turn WA and PWA to discriminator classes where each universal formula is equivalent to some equation. Hence our result implies that the projections turn the decidable equational theory of "WA + D" to non-recursively enumerable.
展开▼
机译:在19世纪Peirce,Schroder等人奠定的基础上,关系代数的现代发展始于Tarski及其同事的工作[21,22]。他们证明关系代数可以捕获ZFC等强大的一阶理论,因此它们的方程式理论是不确定的。 Maddux引入了弱表达关系代数的表达较少的WA类[7]。 Nemeti [16]表明WA具有可判定的普遍理论。通过增加新的操作来增加WA的表达能力已有广泛研究[1、4、11、13、20]。这种扩展通常也具有可判定的通用理论。在这里,我们举一个例子-用集合理论的投影元素扩展WA-并非如此。这些“逻辑”连接词是公理准投影的集合理论的对应物,在关系代数的表示理论中已经对此进行了研究[22,6,19]。我们证明扩展类PWA的准方程理论不是递归可枚举的。通过添加差值算子D,可以将WA和PWA变成鉴别器类,其中每个通用公式都等效于某个方程。因此,我们的结果表明,这些预测将可判定的方程式理论“ WA + D”转换为不可递归枚举。
展开▼
