This paper is a constructive investigation of the relationship between classical modular symbols and overconvergent p-adic modular symbols. Specifically, we give a constructive proof of a control theorem (Theorem 1.1) due to the second author [19] proving existence and uniqueness of overconvergent eigenliftings of classical modular eigensymbols of non-critical slope. As an application we describe a polynomial-time algorithm for explicit computation of associated p-adic L-functions in this case. In the case of critical slope, the control theorem fails to always produce eigenliftings (see Theorem 5.14 and [16] for a salvage), but the algorithm still "succeeds" at producing p-adic L-functions. In the final two sections we present numerical data in several critical slope examples and examine the Newton polygons of the associated p-adic L-functions. R.-Cet article est une exploration constructive des rapports entre les symboles modulaires classiques et les symboles modulaires p-adiques surconvergents. Plus précisément, nous donnons une preuve constructive d'un théorème de contrôle (Théorème 1.1) du deuxième auteur [19] ; ce théorème démontre l'existence et l'unicité des « liftings propres » des symboles propres modulaires classiques de pente non-critique. Comme application, nous décrivons un algorithme en temps polynomial pour le calcul explicite des fonctions L p-adiques associées dans ce cas-là. Dans le cas de pente critique, le théorème de contrôle échoue toujours à produire des « liftings propres » (voir Théorème 5.14 et [16] pour un succédané), mais l'algorithme « réussit » néanmoins à produire des fonctions L p-adiques. Dans les deux dernières sections, nous présentons des données numériques pour plusieurs exemples de pente critique et examinons le polygone de Newton des fonctions L p-adiques associées.
Given a prime $p\gt 2$, an integer $h\geq 0$, and a wide open disk $U$ in the weight space $ \mathcal{W} $ of ${\mathbf{GL} }_{2} $, we construct a Hecke–Galois-equivariant morphism ${ \Psi }_{U}^{(h)} $ from the space of analytic families of overconvergent modular
symbols over $U$ with bounded slope $\leq h$, to the corresponding space of analytic families of overconvergent
modular forms, all with ${ \mathbb{C} }_{p} $-coefficients. We show that there is a finite subset $Z$ of $U$ for which this morphism induces a $p$-adic analytic family of isomorphisms relating overconvergent
modular symbols of weight $k$ and slope $\leq h$ to overconvergent modular forms of weight $k+ 2$ and slope $\leq h$.
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