论文信息 - Algebraic properties and dismantlability of finite posets

Algebraic properties and dismantlability of finite posets

Abstract We show that every finite connected poset which admits certain operations such as Gumm or Jonsson operations, or a near unanimity function is dismantlable. This result is used to prove that a finite poset admits Gumm operations if and only if it admits a near unanimity function. Finite connected posets satisfying these equivalent conditions are characterized by the property that their idempotent subalgebras are dismantlable. As a consequence of these results we obtain that the problem of determining if a finite poset admits a near unanimity function is decidable.

Benoît Larose | László Zádori

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