From Orientations to -adic Period Vectors
Abstract
We propose a bridge between oriented supersingular elliptic curves and the arithmetic of modular curves. To an O-oriented supersingular curve, we attach a class in the relative homology group H(X0(N),C,Z), i.e. modular symbols, compatible with the Hecke action. We then compute vectors of -adic periods by pairing with weight 2 cusp forms via Coleman integration. This yields an explicit, computable map from short combinatorial homology representatives to truncated vectors in (Z/mZ)d. Motivated by this encoding, we formulate the Modular Symbol Inversion (MSI) problem -- recovering a short homology representative from its truncated -adic period data -- and discuss its arithmetic structure, its relation to path problems on isogeny graphs and Bruhat-Tits trees, and potential applications to cryptographic constructions.
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