G. López-Ruiz scite author profile

G. López-Ruiz

3Publications

33Citation Statements Received

101Citation Statements Given

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University of the Basque Country, GAIKER Technology Centre, Ikerlan

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Variational bounds in composites with nonuniform interfacial thermal resistance

López-Ruiz

Bravo‐Castillero

Brenner

et al. 2015

Applied Mathematical Modelling

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a b s t r a c tThe problem of the effective thermal conductivity for a matrix-fiber composite exhibiting a periodic microstructure is studied. The composite is macroscopically anisotropic with nonuniform interfacial thermal resistance between the phases. First, the asymptotic homogenization method, which was employed recently to address related problems, is applied to recover the expression for the effective thermal conductivity obtained from classical micromechanical approaches. Then, improved bounds for the effective conductivity are obtained from a generalization of the two-dimensional realization of results by Lipton and Vernescu (1996). The bounds depend on the concentration and the conductivity of each phase, as well as on the fibers cross-section geometry and type of periodic distribution, and on the nonuniform interfacial resistance. Results are compared numerically with those obtained via asymptotic homogenization and finite element approaches, showing good agreement in a variety of situations.

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Study on the feasibility of the micromix combustion principle in low NO H2 burners for domestic and industrial boilers: A numerical approach

López-Ruiz

Alava

Ilzarbe

2021

Energy

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Experimental and numerical study of NO formation in a domestic H2/air coaxial burner at low Reynolds number

López-Ruiz

Alava

Urresti

et al. 2021

Energy

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G. López-Ruiz

Variational bounds in composites with nonuniform interfacial thermal resistance

Study on the feasibility of the micromix combustion principle in low NO H2 burners for domestic and industrial boilers: A numerical approach

Experimental and numerical study of NO formation in a domestic H2/air coaxial burner at low Reynolds number

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