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MATHEMATICA BOHEMICA, Vol. 127, No. 3, pp. 409-425 (2002)
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# Radical classes of distributive lattices

having the least element

## Jan Jakubik

* Jan Jakubik*, Matematicky ustav SAV, Gresakova 6, 04 01 Kosice, Slovakia, e-mail: ` musavke@saske.sk`

**Abstract:**
Let $\Cal D$ be the system of all distributive lattices and let $\Cal D_0$ be the system of all $L\in \Cal D$ such that $L$ possesses the least element. Further, let $\Cal D_1$ be the system of all infinitely distributive lattices belonging to $\Cal D_0$. In the present paper we investigate the radical classes of the systems $\Cal D$, $\Cal D_0$ and $\Cal D_1$. \endabstract

**Keywords:** distributive lattice, infinite distributivity, radical class

**Classification (MSC2000):** 06D05, 06D10

**Full text of the article:**

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