Mathematica Bohemica (Dec 2021)
Some properties of state filters in state residuated lattices
Abstract
We consider properties of state filters of state residuated lattices and prove that for every state filter $F$ of a state residuated lattice $X$: \begin{itemize} \item[(1)] $F$ is obstinate $\Leftrightarrow$ $L/F \cong\{0,1\}$; \item[(2)] $F$ is primary $\Leftrightarrow$ $L/F$ is a state local residuated lattice; \end{itemize} and that every g-state residuated lattice $X$ is a subdirect product of $\{X/P_{\lambda} \}$, where $P_{\lambda}$ is a prime state filter of $X$. Moreover, we show that the quotient MTL-algebra $X/P$ of a state residuated lattice $X$ by a state prime filter $P$ is not always totally ordered, although the quotient MTL-algebra by a prime filter is totally ordered.
Keywords
