Time dependent hereditary properties of complex materials are well described by power-laws with real order exponent. This experimental observation and analogous electrical experiments, yield a description of these properties by using fractional-order operators. In this paper, elasto-viscous and viscoelastic behaviors of fractional order hereditary materials are firstly described by using fractional mathematical operators, based on recent work of some of the authors. Then, electrical analogous models are introduced. Viscoelastic models have elastic and viscous components which can be obtained by combining springs and dashpots: these models can be equivalently viewed as electrical circuits, where the spring and dashpot are analogous to the ca...
Fractional calculus, i.e. the theory of derivatives and integrals of non-integer order, can be effic...
We develop a fractional return-mapping framework for power-law visco-elasto-plasticity. In our appro...
The aim of the paper is the description of fractional-order differential equations in terms of exact...
Time dependent hereditary properties of complex materials are well described by power-laws with real...
In this paper, electrical analogous models of fractional hereditary materials are introduced. Based ...
Fractional Viscoelasticity is referred to materials, whose constitutive law involves fractional deri...
Fractional hereditary materials are characterized for the presence, in the stress-strain relations, ...
Creep and relaxation tests, performed on various materials like polymers, rubbers and so on are wel...
The rheological features of several complex organic natural tissues such as bones, muscles as well a...
In this work we discuss the connection between classical, fractional and dis- tributed order viscoe...
Soft materials often exhibit a distinctive power-law viscoelastic response arising from broad distri...
We present and review several models of fractional viscous stresses from the literature, which gener...
AbstractViscoelastic characteristics of many materials falling under the category of soft glassy sub...
Fractional calculus, i.e. the theory of derivatives and integrals of non-integer order, can be effic...
We develop a fractional return-mapping framework for power-law visco-elasto-plasticity. In our appro...
The aim of the paper is the description of fractional-order differential equations in terms of exact...
Time dependent hereditary properties of complex materials are well described by power-laws with real...
In this paper, electrical analogous models of fractional hereditary materials are introduced. Based ...
Fractional Viscoelasticity is referred to materials, whose constitutive law involves fractional deri...
Fractional hereditary materials are characterized for the presence, in the stress-strain relations, ...
Creep and relaxation tests, performed on various materials like polymers, rubbers and so on are wel...
The rheological features of several complex organic natural tissues such as bones, muscles as well a...
In this work we discuss the connection between classical, fractional and dis- tributed order viscoe...
Soft materials often exhibit a distinctive power-law viscoelastic response arising from broad distri...
We present and review several models of fractional viscous stresses from the literature, which gener...
AbstractViscoelastic characteristics of many materials falling under the category of soft glassy sub...
Fractional calculus, i.e. the theory of derivatives and integrals of non-integer order, can be effic...
We develop a fractional return-mapping framework for power-law visco-elasto-plasticity. In our appro...
The aim of the paper is the description of fractional-order differential equations in terms of exact...