Fractal Continuum Calculus of Functions on Euler-Bernoulli Beam

Didier Samayoa; Andriy Kryvko; Gelasio Velázquez; Helvio Mollinedo

doi:10.3390/fractalfract6100552

Fractal Continuum Calculus of Functions on Euler-Bernoulli Beam

Didier Samayoa, Andriy Kryvko, Gelasio Velázquez, Helvio Mollinedo

Escuela Superior de Ingeniería Mecánica y Eléctrica (ESIME), Unidad Zacatenco
Unidad Profesional Interdisciplinaria de Ingeniería y Tecnologías Avanzadas (UPIITA)

Research output: Contribution to journal › Article › peer-review

6 Scopus citations

Abstract

A new approach for solving the fractal Euler-Bernoulli beam equation is proposed. The mapping of fractal problems in non-differentiable fractals into the corresponding problems for the fractal continuum applying the fractal continuum calculus ((Formula presented.) -CC) is carried out. The fractal Euler-Bernoulli beam equation is derived as a generalization using (Formula presented.) -CC under analogous assumptions as in the ordinary calculus and then it is solved analytically. To validate the spatial distribution of self-similar beam response, three different classical beams with several fractal parameters are analysed. Some mechanical implications are discussed.

Original language	English
Article number	552
Journal	Fractal and Fractional
Volume	6
Issue number	10
DOIs	https://doi.org/10.3390/fractalfract6100552
State	Published - Oct 2022

Keywords

Euler-Bernoulli beam
Hausdorff dimension
fractal continuum calculus
transversal displacement

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abstract = "A new approach for solving the fractal Euler-Bernoulli beam equation is proposed. The mapping of fractal problems in non-differentiable fractals into the corresponding problems for the fractal continuum applying the fractal continuum calculus ((Formula presented.) -CC) is carried out. The fractal Euler-Bernoulli beam equation is derived as a generalization using (Formula presented.) -CC under analogous assumptions as in the ordinary calculus and then it is solved analytically. To validate the spatial distribution of self-similar beam response, three different classical beams with several fractal parameters are analysed. Some mechanical implications are discussed.",

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AU - Samayoa, Didier

AU - Kryvko, Andriy

AU - Velázquez, Gelasio

AU - Mollinedo, Helvio

PY - 2022/10

Y1 - 2022/10

N2 - A new approach for solving the fractal Euler-Bernoulli beam equation is proposed. The mapping of fractal problems in non-differentiable fractals into the corresponding problems for the fractal continuum applying the fractal continuum calculus ((Formula presented.) -CC) is carried out. The fractal Euler-Bernoulli beam equation is derived as a generalization using (Formula presented.) -CC under analogous assumptions as in the ordinary calculus and then it is solved analytically. To validate the spatial distribution of self-similar beam response, three different classical beams with several fractal parameters are analysed. Some mechanical implications are discussed.

AB - A new approach for solving the fractal Euler-Bernoulli beam equation is proposed. The mapping of fractal problems in non-differentiable fractals into the corresponding problems for the fractal continuum applying the fractal continuum calculus ((Formula presented.) -CC) is carried out. The fractal Euler-Bernoulli beam equation is derived as a generalization using (Formula presented.) -CC under analogous assumptions as in the ordinary calculus and then it is solved analytically. To validate the spatial distribution of self-similar beam response, three different classical beams with several fractal parameters are analysed. Some mechanical implications are discussed.

KW - Euler-Bernoulli beam

KW - Hausdorff dimension

KW - fractal continuum calculus

KW - transversal displacement

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Fractal Continuum Calculus of Functions on Euler-Bernoulli Beam

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Keywords

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