Category:Spectra of Locales
This category contains results about Spectra of Locales.
Definitions specific to this category can be found in Definitions/Spectra of Locales.
Let $\struct{L, \vee, \wedge, \preceq}$ be a locale.
Spectrum As Completely Prime Filters
Let $\map {\operatorname{pt}} L$ denote the set of points as completely prime filters of $L$.
For each $a \in L$, let:
- $\Sigma_a = \set{p \in \map {\operatorname{pt}} L : a \in p}$
The spectrum of $L$, denoted $\map {\operatorname{Sp}} L$, is the topological space $\struct{\map {\operatorname{pt}} L, \set{\Sigma_a : a \in L}}$
Spectrum As Frame Homomorphisms
Let $\map {\operatorname{pt}} L$ denote the set of points as frame homomorphisms of $L$, that is:
- $\map {\operatorname{pt}} L$ is the set of frame homomorphisms $h : L \to \mathbf 2$
where $\struct{\mathbf 2, \vee, \wedge, \neg, \preceq}$ denotes the (Boolean lattice) two
For each $a \in L$, let:
- $\Sigma_a = \set{h \in \map {\operatorname{pt}} L : \map h a = \top}$
The spectrum of $L$, denoted $\map {\operatorname{Sp}} L$, is the topological space $\struct{\map {\operatorname{pt}} L, \set{\Sigma_a : a \in L}}$
Spectrum As Meet-Irreducible Elements
Let $\map {\operatorname{pt}} L$ denote the set of points as meet-irreducible elements of $L$.
For each $a \in L$, let:
- $\Sigma_a = \set{p \in \map {\operatorname{pt}} L : a \npreceq p}$
The spectrum of $L$, denoted $\map {\operatorname{Sp}} L$, is the topological space $\struct{\map {\operatorname{pt}} L, \set{\Sigma_a : a \in L}}$
Spectrum As Continuous Maps
Let $\map {\operatorname{pt}} L$ denote the set of points as continuous maps of $L$, that is:
- $\map {\operatorname{pt}} L$ is the set of continuous maps $f : \mathbf 2 \to L$
where $\struct{\mathbf 2, \vee, \wedge, \neg, \preceq}$ denotes the (Boolean lattice) two.
For each $a \in L$, let:
- $\Sigma_a = \set{f \in \map {\operatorname{pt}} L : \map {\loweradjoint f} a = \top}$
where $\loweradjoint f : L \to \mathbf 2$ denotes the frame homomorphism such that $f = \paren{\loweradjoint f}^{\operatorname{op}}$
The spectrum of $L$, denoted $\map {\operatorname{Sp}} L$, is the topological space $\struct{\map {\operatorname{pt}} L, \set{\Sigma_a : a \in L}}$
Pages in category "Spectra of Locales"
The following 7 pages are in this category, out of 7 total.