Neural Codes and Neural ring endomorphisms
Abstract
We investigate combinatorial, topological and algebraic properties of certain classes of neural codes. We look into a conjecture that states if the minimal open convex embedding dimension of a neural code is two then its minimal convex embedding dimension is also two. We prove the conjecture for two interesting classes of examples and provide a counterexample for the converse of the conjecture. We introduce a new class of neural codes, Doublet maximal. We show that a Doublet maximal code is open convex if and only if it is max-intersection complete. We prove that surjective neural ring homomorphisms preserve max-intersection complete property. We introduce another class of neural codes, Circulant codes. We give the count of neural ring endomorphisms for several sub-classes of this class.
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