Added l^p sequence spaces.
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@@ -164,7 +164,7 @@ After the duality of $L^p$ and $L^q$ is established for Hölder conjugate expone
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If $q < \infty$, then the \hyperref[Monotone Convergence Theorem]{theorem:mct} implies that $\norm{g}_{L^q(X; F)} \le \norm{\phi_g}_{L^p(X; E)^*}$. Otherwise,
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\[
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\norm{g}_{L^\infty(X; H)} \le \sup_{n \in \natp}\norm{g_n}_{L^\infty(X; H)} \le \norm{\phi}_{L^1(X; H)^*}
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\norm{g}_{L^\infty(X; H)} \le \sup_{n \in \natp}\norm{g_n}_{L^\infty(X; H)} \le \norm{\phi_g}_{L^1(X; H)^*}
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\]
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The above argument shows that the truncation argument was technically not required. By applying the truncated case again, $\norm{g}_{L^q(X; F)} = \norm{\phi_g}_{L^p(X; E)^*}$.
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@@ -3,3 +3,4 @@
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\input{./definition.tex}
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\input{./duality.tex}
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\input{./seq.tex}
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32
src/fa/lp/seq.tex
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32
src/fa/lp/seq.tex
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@@ -0,0 +1,32 @@
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\section{$l^p$ Direct Sums}
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\label{section:lp-direct-sum}
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\begin{definition}[$l^p$-Direct Sum]
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\label{definition:lp-direct-sum}
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Let $\seqi{X}$ be normed vector spaces over $K \in \RC$ and $p \in [1, \infty)$, then the \textbf{$l^p$-direct sum} of $\seqi{X}$ is the space
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\[
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[l^p(I); X_i] = \bracs{x \in \prod_{i \in I}X_i \bigg | \sum_{i \in I}\norm{x_i}_{X_i}^p < \infty}
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\]
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equipped with the norm
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\[
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\norm{x}_{[l^p(I); X_i]} = \braks{\sum_{i \in I}\norm{x_i}_{X_i}^{p}}^{1/p}
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\]
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\end{definition}
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\begin{definition}[$l^\infty$-Direct Product]
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\label{definition:l-infty-direct-product}
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Let $\seqi{X}$ be normed vector spaces over $K \in \RC$ and $p \in [1, \infty)$, then the \textbf{$l^\infty$-direct product} of $\seqi{X}$ is the space
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\[
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[l^\infty(I); X_i] = \bracs{x \in \prod_{i \in I}X_i \bigg | \sup_{i \in I}\norm{x_i}_{X_i} < \infty}
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\]
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equipped with the norm
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\[
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\norm{x}_{[l^\infty(I); X_i]} = \sup_{i \in I}\norm{x_i}_{X_i}
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\]
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\end{definition}
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