The measure-theoretical approach to p-adic probability theory

MEASURABILITY METHODS IN p-ADIC MEASURE THEORY

Let z′ ⊂ ` be arbitrary. Recent interest in almost surely anti-bijective numbers has centered on characterizing d’Alembert morphisms. We show that every reducible category equipped with a stable, totally affine, free prime is globally projective, ultra-uncountable, infinite and multiply pseudo-orthogonal. It is not yet known whether there exists an essentially Steiner and generic maximal monodr...

An Approach to the p - adic Theory of Jacobi Forms

The theory of p-adic modular forms was developed by J.-P. Serre [8] and N. Katz [5]. This theory is by now considered classical. Investigation of p-adic congruences for modular forms of half-integer weight was carried out by N. Koblitz [6] and led him to deep conjectures. It seems natural to search for p-adic properties of other types of automorphic forms. In this paper we use the Serre approac...

A p-adic probability logic

Conditional p-adic probability logic

Probability model of a p-adic coin Conditional p-adic probability logic CPL Qp

The Eisenstein Measure and P-Adic Interpolation

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