伪补格上Grätzer和Lakser的一个1971问题

Mathematica Pannonica Pub Date : 2023-09-25 DOI:10.1556/314.2023.00020

Jonathan David Farley, Dominic van der Zypen

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摘要

Grätzer和Lakser在1971年的《美国数学学会汇刊》中提出了一个问题:由2n⊕1生成的子变种的合并类中的伪补分配格是否可以被表征为对于1 <在2i⊕1上不具有*同态;我& lt;n。本文将回答这个问题。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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A 1971 question of Grätzer and Lakser on pseudocomplemented lattices

Grätzer and Lakser asked in the 1971 Transactions of the American Mathematical Society if the pseudocomplemented distributive lattices in the amalgamation class of the subvariety generated by 2 n ⊕ 1 can be characterized by the property of not having a * homomorphism onto 2 i ⊕ 1 for 1 < i < n . In this article, this question is answered.

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Mathematica Pannonica

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