From 62798104fc629cb1a09f4472e08b2158b11a9d3c Mon Sep 17 00:00:00 2001 From: "did:key:z6MkmBZkXGPJpw81cNsuCoq2wJ3zYGQ2addNU7qWgdKGGtEs" Date: Fri, 12 Jun 2026 20:37:00 +0000 Subject: [PATCH] Level 10 Math Upgrade v4: Final Notation and Bibliography Polish --- .../armada_3_jmp/paper_1c_math_JMP.tex | 14 ++++++++++++-- 1 file changed, 12 insertions(+), 2 deletions(-) diff --git a/papers/project_paper_1_relativity/armada_3_jmp/paper_1c_math_JMP.tex b/papers/project_paper_1_relativity/armada_3_jmp/paper_1c_math_JMP.tex index 7741d2e6..66f9a30b 100644 --- a/papers/project_paper_1_relativity/armada_3_jmp/paper_1c_math_JMP.tex +++ b/papers/project_paper_1_relativity/armada_3_jmp/paper_1c_math_JMP.tex @@ -50,7 +50,7 @@ We assume $\mathcal{P}$ is \emph{graded}, meaning there exists a surjective rank The \emph{layer} at height $t$ is the antichain $L_t = \{v \in V \mid h(v) = t\}$. The poset possesses an emergent \emph{topological dimension} $d$ if the cardinalities of the layers grow asymptotically as \begin{equation} -|L_t| \sim \Theta(t^{d-1}) \quad \text{as} \quad t \to \infty. +|L_t| = \Theta(t^{d-1}) \quad \text{as} \quad t \to \infty. \end{equation} \end{definition} This definition naturally mirrors the volumetric boundary growth of a $d$-dimensional continuous space, where the cross-sectional area at radial time $t$ scales as $t^{d-1}$. @@ -91,7 +91,7 @@ The transition kernel $T(u \to v)$ representing the probability that a random wa \begin{lemma}[Green's Function Form] The retarded Green's function $G_R(x, x')$ satisfies \begin{equation} -\Delta_{\mathcal{P}} G_R(x, x') = \delta(x, x'). +\Delta_{\mathcal{P}} G_R(x, x') = \delta_{x, x'}. \end{equation} Because the graph is directed and graded, $G_R(x, x') = 0$ unless $h(x) \le h(x')$. \end{lemma} @@ -186,6 +186,16 @@ D.~J. Kleitman and B.~L. Rothschild, \newblock \emph{Asymptotic enumeration of partial orders on a finite set}, \newblock Transactions of the American Mathematical Society \textbf{205}, 205--220 (1975). +\bibitem{Surya2019} +S.~Surya, +\newblock \emph{The causal set approach to quantum gravity}, +\newblock Living Reviews in Relativity \textbf{22}, 5 (2019). + +\bibitem{Rideout2009} +D.~Rideout and P.~Wallden, +\newblock \emph{Spacetime topology from the causal set}, +\newblock Journal of Physics: Conference Series \textbf{174}, 012017 (2009). + \end{thebibliography} \end{document}