Add to ORKGThe degree by which a function can be differentiated need not be restricted to integer values. Usually most of the field equations of physics are taken to be second order, curiosity asks what happens if this is only approximately the case and the field equations are nearly second order. For Robertson-Walker cosmology there is a simple fractional modification of the Friedman and conservation equations. In general fractional gravitational equations similar to Einstein’s are hard to define as this requires fractional derivative geometry. What fractional derivative geometry might entail is briefly looked at and it turns out that even asking very simple questions in two dimensions leads to ambiguous or intractable results. A two dimensional line...
Since modern continuum mechanics is mainly characterized by the strong influence of microstructure, ...
We introduce fractional flat space, described by a continuous geometry with constant non-integer Hau...
Fractional and fractal derivatives are both generalizations of the usual derivatives that consider d...
The first derivative of a particle coordinate means its velocity, the second means its acceleration,...
The invitation to contribute to this anthology of articles on the fractional calculus (FC) encourage...
Fractional derivatives were invented by Leibniz soon after their integer-order cousins. Recently, th...
Fractional Calculus is a study of an extension of derivatives and integrals to non integer orders an...
70 pags., 13 figs.Multi-fractional theories with integer-order derivatives are models of gravitation...
Few could have imagined the vast developments made in the field of fractional calculus which was fir...
Fractional relativity theory is developed in the \(\Lambda\)-fractional space, introduced by the rec...
none2This book contains 20 contributions by the leading authors in fracrional dynmics. It covers t...
In recent years, researchers interested in the field of fractals and related subjects have also begu...
AbstractIn this paper some basic definitions of fractional vector calculus are introduced. A fractio...
Fractional calculus provides the possibility of introducing integrals and derivatives of an arbitrar...
This paper studies the nature of fractional linear transformations in a general relativ- ity contex...
Since modern continuum mechanics is mainly characterized by the strong influence of microstructure, ...
We introduce fractional flat space, described by a continuous geometry with constant non-integer Hau...
Fractional and fractal derivatives are both generalizations of the usual derivatives that consider d...
The first derivative of a particle coordinate means its velocity, the second means its acceleration,...
The invitation to contribute to this anthology of articles on the fractional calculus (FC) encourage...
Fractional derivatives were invented by Leibniz soon after their integer-order cousins. Recently, th...
Fractional Calculus is a study of an extension of derivatives and integrals to non integer orders an...
70 pags., 13 figs.Multi-fractional theories with integer-order derivatives are models of gravitation...
Few could have imagined the vast developments made in the field of fractional calculus which was fir...
Fractional relativity theory is developed in the \(\Lambda\)-fractional space, introduced by the rec...
none2This book contains 20 contributions by the leading authors in fracrional dynmics. It covers t...
In recent years, researchers interested in the field of fractals and related subjects have also begu...
AbstractIn this paper some basic definitions of fractional vector calculus are introduced. A fractio...
Fractional calculus provides the possibility of introducing integrals and derivatives of an arbitrar...
This paper studies the nature of fractional linear transformations in a general relativ- ity contex...
Since modern continuum mechanics is mainly characterized by the strong influence of microstructure, ...
We introduce fractional flat space, described by a continuous geometry with constant non-integer Hau...
Fractional and fractal derivatives are both generalizations of the usual derivatives that consider d...