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## Meet-semidistributive lattices

Abbreviation: MsdLat

### Definition

A meet-semidistributive lattice is a lattice $\mathbf{L}=\langle L,\vee ,\wedge \rangle$ that satisfies

the meet-semidistributive law SD$_{\wedge}$: $x\wedge y=x\wedge z\Longrightarrow x\wedge y=x\wedge(y\vee z)$

##### Morphisms

Let $\mathbf{L}$ and $\mathbf{M}$ be meet-semidistributive lattices. A morphism from $\mathbf{L}$ to $\mathbf{M}$ is a function $h:L\rightarrow M$ that is a homomorphism:

$h(x\vee y)=h(x)\vee h(y)$, $h(x\wedge y)=h(x)\wedge h(y)$

### Examples

Example 1: $D[d]=\langle D\cup\{d'\},\vee ,\wedge\rangle$, where $D$ is any distributive lattice and $d$ is an element in it that is split into two elements $d,d'$ using Alan Day's doubling construction.

### Properties

Classtype quasivariety undecidable yes yes no no no no no no unbounded

### Finite members

$\begin{array}{lr} f(1)= &1\\ f(2)= &1\\ f(3)= &1\\ f(4)= &2\\ f(5)= &4\\ f(6)= &9\\ f(7)= &23\\ f(8)=&65\\ f(9)=&197\\ f(10)=&636\\ f(11)=&2171\\ f(12)=&7756\\ f(13)=&28822\\ f(14=&110805\\ \end{array}$