Solution of Belousov's problem
Abstract
The authors prove that a local n-quasigroup defined by the equation xn+1 = F (x1, ..., xn) = [f1 (x1) + ... + fn (xn)]/[x1 + ... + xn], where fi (xi), i, j = 1, ..., n, are arbitrary functions, is irreducible if and only if any two functions fi (xi) and fj (xj), i ≠ j, are not both linear homogeneous, or these functions are linear homogeneous but fi (xi)/xi ≠ fj (xj)/xj. This gives a solution of Belousov's problem to construct examples of irreducible n-quasigroups for any n ≥ 3.
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