Beam Models and Quantum Systems with Linear Potentials Based on Airy Functions

dc.contributor.author	José A. Gómez Hernández
dc.contributor.author	Juan Toribio Milané
dc.contributor.author	Francis L. Álvarez Paulino
dc.contributor.author	Manuel L. Reyes-Cordero
dc.date.accessioned	2026-04-16T19:36:42Z
dc.date.available	2026-04-16T19:36:42Z
dc.date.issued	2026-04-09
dc.description.abstract	This article provides a rigorous study of Airy functions, emphasizing their construction by power series, their relation with Bessel functions, and their canonical integral representation. We highlight their asymptotic properties and structural role in mathematical physics. To illustrate their applicability, we develop three analytical models: the Euler–Bernoulli beam under self-weight, the quantum bouncer with a linear gravitational potential, and the particle in a uniform electric field. In each case, the quantization conditions and physical scales naturally emerge from the zeros of the Airy function. These results confirm the central role of Airy functions in bridging differential equations, special functions, and applied physics.
dc.identifier.citation	Beam Models and Quantum Systems with Linear Potentials Based on Airy Functions. (2026). Alma Mater, 1(1).
dc.identifier.uri	https://repositoriovip.uasd.edu.do/handle/123456789/1652
dc.language.iso	en
dc.title	Beam Models and Quantum Systems with Linear Potentials Based on Airy Functions
dc.type	Article

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