Fractional derivative rheological models were recognised to be very effective in describing the viscoelastic behaviour of materials, especially of polymers, and when applied to dynamic problems the resulting equations of motion, after a fractional state-space expansion, can still be studied in terms of modal analysis. But the growth in matrix dimensions carried by this expansion is in general so fast to make the calculations too cumbersome, especially for finite element applications. In this paper a discretization technique for continuous structures is presented, adopting the Rayleigh-Ritz method, aimed to reduce the computational effort. The solution of the equation of motion is approximated on the basis of a linear combination of of sha...
Non integer, fractional order derivative rheological models are known to be very effective in descri...
The dynamics of many classes of materials may be well modeled by fractional-order differential equat...
Fractional derivative is increasingly being deployed to improve existing mathematical models due to ...
Fractional derivative rheological models were recognised to be very effective in describing the visc...
Fractional derivative rheological models were recognised to be very effective in describing the visc...
In the present study non-integer order or fractional derivative rheological models are applied to a...
Fractional derivative rheological models are known to be very effective in describing the viscoelast...
This paper presents a method for reducing the computational effort due to finite element analysis of...
ractional derivative rheological models are known to be very effective in describing the viscoelasti...
Fractional derivative rheological models are known to be very effective in describing the viscoelast...
The use of linear viscoelasticity together with fractional calculus in time-domain structural modeli...
Fractional derivative rheological models are known to be very useful for describing the viscoelastic...
Fractional derivative rheological models are known to be very useful for describing the viscoelastic...
Fractional derivative rheological models are known to be very useful for describing the viscoelastic...
AbstractWe supposed in the work of the research fractional model with one mechanism, which simplifie...
Non integer, fractional order derivative rheological models are known to be very effective in descri...
The dynamics of many classes of materials may be well modeled by fractional-order differential equat...
Fractional derivative is increasingly being deployed to improve existing mathematical models due to ...
Fractional derivative rheological models were recognised to be very effective in describing the visc...
Fractional derivative rheological models were recognised to be very effective in describing the visc...
In the present study non-integer order or fractional derivative rheological models are applied to a...
Fractional derivative rheological models are known to be very effective in describing the viscoelast...
This paper presents a method for reducing the computational effort due to finite element analysis of...
ractional derivative rheological models are known to be very effective in describing the viscoelasti...
Fractional derivative rheological models are known to be very effective in describing the viscoelast...
The use of linear viscoelasticity together with fractional calculus in time-domain structural modeli...
Fractional derivative rheological models are known to be very useful for describing the viscoelastic...
Fractional derivative rheological models are known to be very useful for describing the viscoelastic...
Fractional derivative rheological models are known to be very useful for describing the viscoelastic...
AbstractWe supposed in the work of the research fractional model with one mechanism, which simplifie...
Non integer, fractional order derivative rheological models are known to be very effective in descri...
The dynamics of many classes of materials may be well modeled by fractional-order differential equat...
Fractional derivative is increasingly being deployed to improve existing mathematical models due to ...