Fractional calculus plays an increasingly important role in mechanics research. This review investigates the progress of an interdisciplinary approach, fractional plasticity (FP), based on fractional derivative and classic plasticity since FP was proposed as an efficient alternative to modelling state-dependent nonassociativity without an additional plastic potential function. Firstly, the stress length scale (SLS) is defined to conduct fractional differential, which influences the direction and intensity of the nonassociated flow of geomaterials owing to the integral definition of the fractional operator. Based on the role of SLS, two branches of FP, respectively considering the past stress and future reference critical state can be develo...
This chapter is devoted to the application of fractional calculus in mechanics of materials and ther...
The rapid growth of fields such as metamaterials, composites, architected materials, porous solids, ...
Abstract It was found that the constitutive behaviour of granular soil was dependent on its density ...
Fractional calculus has been successfully applied to char-acterize the rheological property of visco...
A novel three-dimensional (3D) fractional plastic flow rule that is not limited by the coordinate ba...
This short chapter provides a fractional generalization of gradient mechanics, an approach (original...
In the paper the generalisation of classical rate independent plasticity using fractional calculus i...
Several enriched continuum mechanics theories have been proposed by the scientific community in orde...
Creep and relaxation tests, performed on various materials like polymers, rubbers and so on are well...
Few could have imagined the vast developments made in the field of fractional calculus which was fir...
The use of linear viscoelasticity together with fractional calculus in time-domain structural modeli...
This paper regards soft rock as a heavily overconsolidated clay and proposes a new fractional elasto...
We develop a strain-gradient plasticity theory based on fractional derivatives of plastic strain and...
We develop a fractional return-mapping framework for power-law visco-elasto-plasticity. In our appro...
In recent decades constitutive equations for polymers involving fractional calculus have been the ob...
This chapter is devoted to the application of fractional calculus in mechanics of materials and ther...
The rapid growth of fields such as metamaterials, composites, architected materials, porous solids, ...
Abstract It was found that the constitutive behaviour of granular soil was dependent on its density ...
Fractional calculus has been successfully applied to char-acterize the rheological property of visco...
A novel three-dimensional (3D) fractional plastic flow rule that is not limited by the coordinate ba...
This short chapter provides a fractional generalization of gradient mechanics, an approach (original...
In the paper the generalisation of classical rate independent plasticity using fractional calculus i...
Several enriched continuum mechanics theories have been proposed by the scientific community in orde...
Creep and relaxation tests, performed on various materials like polymers, rubbers and so on are well...
Few could have imagined the vast developments made in the field of fractional calculus which was fir...
The use of linear viscoelasticity together with fractional calculus in time-domain structural modeli...
This paper regards soft rock as a heavily overconsolidated clay and proposes a new fractional elasto...
We develop a strain-gradient plasticity theory based on fractional derivatives of plastic strain and...
We develop a fractional return-mapping framework for power-law visco-elasto-plasticity. In our appro...
In recent decades constitutive equations for polymers involving fractional calculus have been the ob...
This chapter is devoted to the application of fractional calculus in mechanics of materials and ther...
The rapid growth of fields such as metamaterials, composites, architected materials, porous solids, ...
Abstract It was found that the constitutive behaviour of granular soil was dependent on its density ...