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INTERNATIONAL JOURNAL OF ENGINEERING SCIENCE

ISSN:

0020-7225

eISSN:

1879-2197

Disciplines
(Field of Science):

  • Architecture and urban planning (Engineering and Technology)
  • Information and communication technology (Engineering and Technology)
  • Biomedical engineering (Engineering and Technology)
  • Civil engineering, geodesy and transport (Engineering and Technology)
  • Materials engineering (Engineering and Technology)
  • Mechanical engineering (Engineering and Technology)
  • Medical biology (Medical and Health Sciences )
  • Biotechnology (Natural sciences)

Ministry points: Help

Ministry points - current year
Year Points List
Year 2024 200 Ministry scored journals list 2024
Ministry points - previous years
Year Points List
2024 200 Ministry scored journals list 2024
2023 200 Ministry Scored Journals List
2022 200 Ministry Scored Journals List 2019-2022
2021 200 Ministry Scored Journals List 2019-2022
2020 200 Ministry Scored Journals List 2019-2022
2019 200 Ministry Scored Journals List 2019-2022
2018 40 A
2017 40 A
2016 40 A
2015 40 A
2014 40 A
2013 40 A
2012 35 A
2011 35 A
2010 32 A

Model:

Hybrid

Points CiteScore:

Points CiteScore - current year
Year Points
Year 2022 12.8
Points CiteScore - previous years
Year Points
2022 12.8
2021 14
2020 13.4
2019 15.2
2018 11.8
2017 8.7
2016 6.5
2015 5.3
2014 4.4
2013 4
2012 2.8
2011 2.1

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total: 23

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Catalog Journals

Year 2024
  • Can we really solve an arch stability problem?

    We bring attention to the problem of solving nonlinear boundary-value problems for elastic structures such as arches and shells. Here we discuss a classical problem of a shear-deformable arch postbuckling. Considering a postbuckling behaviour of a circular arch we discuss the possibility to find numerically a solution for highly nonlinear regimes. The main attention is paid to the problem of determination of all solutions. The...

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  • M-integral for finite anti-plane shear of a nonlinear elastic matrix with rigid inclusions
    Publication

    The path-independent M-integral plays an important role in analysis of solids with inhomogeneities. However, the available applications are almost limited to linear-elastic or physically non-linear power law type materials under the assumption of infinitesimal strains. In this paper we formulate the M-integral for a class of hyperelastic solids undergoing finite anti-plane shear deformation. As an application we consider the problem...

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  • On mechanics of piezocomposite shell structures

    This study presents an original and novel investigation into the mechanics of piezo-flexo-magneto-elastic nanocomposite doubly-curved shells (PFMDCSs) and the ability to detect the lower and higher levels of electro-magnetic fields. In this context, by utilizing the first-order shear deformation shell model, stresses and strains are acquired. By imposing Hamilton's principle and the von Kármán approach, the governing equations...

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  • Surface finite viscoelasticity and surface anti-plane waves

    We introduce the surface viscoelasticity under finite deformations. The theory is straightforward generalization of the Gurtin–Murdoch model to materials with fading memory. Surface viscoelasticity may reflect some surface related creep/stress relaxation phenomena observed at small scales. Discussed model could also describe thin inelastic coatings or thin interfacial layers. The constitutive equations for surface stresses are...

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Year 2023
  • Anti-plane shear waves in an elastic strip rigidly attached to an elastic half-space

    We consider the anti-plane shear waves in a domain consisting of an infinite layer with a thin coating lying on an elastic half-space. The elastic properties of the coating, layer, and half-space are assumed to be different. On the free upper surface we assume the compatibility condition within the Gurtin–Murdoch surface elasticity, whereas at the plane interface we consider perfect contact. For this problem there exist two possible...

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  • Ellipticity of gradient poroelasticity

    We discuss the ellipticity properties of an enhanced model of poroelastic continua called dilatational strain gradient elasticity. Within the theory there exists a deformation energy density given as a function of strains and gradient of dilatation. We show that the equilibrium equations are elliptic in the sense of Douglis–Nirenberg. These conditions are more general than the ordinary and strong ellipticity but keep almost all...

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  • On a 3D material modelling of smart nanocomposite structures
    Publication

    - INTERNATIONAL JOURNAL OF ENGINEERING SCIENCE - Year 2023

    Smart composites (SCs) are utilized in electro-mechanical systems such as actuators and energy harvesters. Typically, thin-walled components such as beams, plates, and shells are employed as structural elements to achieve the mechanical behavior desired in these composites. SCs exhibit various advanced properties, ranging from lower order phenomena like piezoelectricity and piezomagneticity, to higher order effects including flexoelectricity...

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  • On analysis of nanocomposite conical structures
    Publication

    - INTERNATIONAL JOURNAL OF ENGINEERING SCIENCE - Year 2023

    This research examines the analysis of rotating truncated conical baskets reinforced by carbon nanotubes around the two independent axes. A time-dependent analysis is considered, and the nonlinear dynamic governing equations are extracted using the energy method. Carbon nanotubes (CNTs) reinforced the conical basket, and the structure's mechanical properties are determined based on the several distributions of carbon nanotubes....

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  • On dynamics of origami-inspired rod
    Publication

    We discuss the dynamics of a relatively simple origami-inspired structure considering discrete and continuum models. The latter was derived as a certain limit of the discrete model. Here we analyze small in-plane deformations and related equations of infinitesimal motions. For both models, dispersion relations were derived and compared. The comparison of the dispersion relations showed that the continuum model can capture the behavior...

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  • On time-dependent nonlinear dynamic response of micro-elastic solids

    A new approach to the mechanical response of micro-mechanic problems is presented using the modified couple stress theory. This model captured micro-turns due to micro-particles' rotations which could be essential for microstructural materials and/or at small scales. In a micro media based on the small rotations, sub-particles can also turn except the whole domain rotation. However, this framework is competent for a static medium....

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Year 2022
Year 2021
Year 2020
Year 2019
Year 2014
  • Singular curves in the resultant thermomechanics of shells
    Publication

    Some geometric and kinematic relations associated with the curve moving on the shell base surface are discussed. The extended surface transport relation and the extended surface divergence theorems are proposed for the piecewise smooth tensor fields acting on the regular and piecewise regular surfaces. The recently formulated resultant, two-dimensionally exact, thermodynamic shell relations - the balances of mass, linear and angular...

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