A note on direct products

Abstract

By an algebra is meant an ordered set Γ = 〈V,R1, …, Rn, O1, …, Om〉, where V is a class, Ri (1 ≤ i ≤, n) is a relation on nj elements of V (i.e. Ri ⊆ Vni), and Oj (1 ≤ i ≤ n) is an operation on elements of V such that Oj(x1, … xmj) ∈ V) for all x1, …, xmj ∈ V). A sentence S of the first-order functional calculus is valid in Γ, if it contains just individual variables x1, x2, …, relation variables ϱ1, …,ϱn, where ϱi,- is nj-ary (1 ≤ i ≤ n), and operation variables σ1, …, σm, where σj is mj-ary (1 ≤, j ≤ m), and S holds if the individual variables are interpreted as ranging over V, ϱi is interpreted as Ri, and σi as Oj. If {Γi}i≤α is a (finite or infinite) sequence of algebras Γi, where Γi = 〈Vi, Ri〉 and Ri, is a binary relation, then by the direct productΓ = Πi<αΓi is meant the algebra Γ = 〈V, R〉, where V consists of all (finite or infinite) sequences x = 〈x1, x2, …, xi, …〉 with Xi ∈ Vi and where R is a binary relation such that two elements x and y of V are in the relation R if and only if xi and yi- are in the relation Ri for each i < α.