PlanetPhysics/Gene Nets Physical and Mathemaical Models

Genetic `nets', or networks , ${\displaystyle GN}$ -- that form a living organism's genome --are mathematical models of functional genes linked through their non-linear, [[../NewtonianMechanics/|dynamic]] interactions.

A simple genetic (or gene) network ${\displaystyle G{N}_s}$ may be thus represented by a directed graph ${\displaystyle G_D}$ -the gene net digraph- whose nodes (or vertices) are the genes ${\displaystyle g_i}$ of a cell or a multicellular organism and whose edges (arcs) are arrows representing the actions of a gene ${\displaystyle a_g^i}$ on a linked gene or genes; such a directed [[../Bijective/|graph]] representing a gene network has a canonically associated biogroupoid ${\displaystyle {𝒢}_B}$ which is generated or directly computed from the directed graph ${\displaystyle G_D}$.

The simplest, Boolean, or two-state models of genomes represented by such directed graphs of gene networks form a proper subcategory of the [[../Cod/|category]] of n-state genetic networks, Failed to parse (unknown function "\L"): {\displaystyle '''GN''' _{\L{}M_n}} that operate on the basis of a \L{}ukasiewicz-Moisil n-valued logic algebra ${\displaystyle L{M}_n}$. Then, the category of genetic networks, Failed to parse (unknown function "\L"): {\displaystyle '''GN''' _{\L{}M_n}} was shown in ref. ^[1] to form a subcategory of the \htmladdnormallink{algebraic category of \L{}ukasiewicz algebras}{http://planetphysics.us/encyclopedia/AlgebraicCategoryOfLMnLogicAlgebras.html}, ${\displaystyle ℒℳ}$ ^[2]. There are several published, extensive [[../AAT/|computer simulations]] of Boolean two-state models of both genetic and neuronal networks (for a recent summary of such [[../LQG2/|computations]] see, for example, ref. ^[1]. Most, but not all, such mathematical models are Bayesian, and therefore involve computations for random networks that may have limited biological relevance as the topology of genomes, defined as their connectivity, is far from being random.

The [[../AAT/|category of automata]] (or [[../AAT/|sequential machines]] based on Chrysippean or Boolean logic) and the category of ${\displaystyle (M,R)}$-systems (which can be realized as concrete metabolic-repair biosystems of enzymes, genes, and so on) are subcategories of the category of gene nets Failed to parse (unknown function "\L"): {\displaystyle '''GN''' _{\L{}M_n}} . The latter corresponds to [[../RSystemsCategory/|organismic sets]] of zero-th order ${\displaystyle S_0}$ in the simpler, Rashevsky's [[../TheoryOfOrganismicSets/|theory of organismic sets]].

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