From 7c66b227a494748e2a546fb85317accd00aebe53 Mon Sep 17 00:00:00 2001
From: Justin Gassner <justin.gassner@mailbox.org>
Date: Thu, 15 Feb 2024 05:11:07 +0100
Subject: Update

---
 pages/spectral-theory/test/basic.md | 32 +++++++++++++-------------------
 1 file changed, 13 insertions(+), 19 deletions(-)

(limited to 'pages/spectral-theory')

diff --git a/pages/spectral-theory/test/basic.md b/pages/spectral-theory/test/basic.md
index 05405f4..b1015d1 100644
--- a/pages/spectral-theory/test/basic.md
+++ b/pages/spectral-theory/test/basic.md
@@ -32,25 +32,19 @@ nav_order: 2
 > A *regular value* of $T$ is a complex number $\lambda$ for which the resolvent $R_{\lambda}(T)$ exists,
 > has dense domain and is bounded.
 > The set of all regular values of $T$ is called the *resolvent set* of $T$ and denoted $\rho(T)$.
-> The complement of the resolvent set in the complex plane is called the *spectrum* of $T$ and denoted $\sigma(T)$.
+> The complement of the resolvent set in the complex plane
+> is called the *spectrum* of $T$ and denoted $\sigma(T)$.
 > The elements of the spectrum of $T$ are called the *spectral values* of $T$.
 
-{: .definition-title }
-> Definition (point spectrum, residual spectrum, continuous spectrum)
->
-> Let $T : \dom{T} \to X$ be an operator in a complex normed space $X$.
-> The *point spectrum* $\pspec{T}$ is the set of all $\lambda \in \CC$
-> for which the resolvent $R_\lambda(T)$ does not exist.
-> The *residual spectrum* $\rspec{T}$ is the set of all $\lambda \in \CC$
-> for which the resolvent $R_\lambda(T)$ exists, but is not densely defined.
-> The *continuous spectrum* $\cspec{T}$ is the set of all $\lambda \in \CC$
-> for which the resolvent $R_\lambda(T)$ exists and is densely defined, but unbounded.
-
-| If $R_\lambda(T)$ exists, | is densely defined | and is bounded ... | ... then $\lambda$ belongs to the |
-|:-------------------------:|:------------------:|:------------------:|-----------------------------------|
-|             ✗             |          -         |          -         | point spectrum $\pspec{T}$        |
-|             ✓             |          ✗         |          ?         | residual spectrum $\rspec{T}$     |
-|             ✓             |          ✓         |          ✗         | continuous spectrum $\cspec{T}$   |
-|             ✓             |          ✓         |          ✓         | resolvent set $\rho(T)$           |
+{% definition Point Spectrum, Residual Spectrum, Continuous Spectrum %}
+Let $T : \dom{T} \to X$ be an operator in a complex normed space $X$.
+The *point spectrum* $\pspec{T}$ is the set of all $\lambda \in \CC$
+for which the resolvent $R_\lambda(T)$ does not exist.
+The *residual spectrum* $\rspec{T}$ is the set of all $\lambda \in \CC$
+for which the resolvent $R_\lambda(T)$ exists, but is not densely defined.
+The *continuous spectrum* $\cspec{T}$ is the set of all $\lambda \in \CC$
+for which the resolvent $R_\lambda(T)$ exists and is densely defined, but unbounded.
+{% enddefinition %}
 
-By definition, the sets $\pspec{T}$, $\rspec{T}$, $\cspec{T}$ and $\rho(T)$ form a partition of the complex plane.
+By definition, the sets $\pspec{T}$, $\rspec{T}$, $\cspec{T}$ and $\rho(T)$
+form a partition of the complex plane.
-- 
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