Fractional order differential equations arise naturally in the modeling of many complex physical processes in various engineering and science disciplines.
We propose an efficient two-step method for crystal image analysis.In the first step,a 2D synchrosqueezed transform(SST)is applied to extract mesoscopic and microscopic information from atomic crystal
We present a variational formulation of the immersed finite element method,which allows incompressible Newtonian fluids to interact with a general hyperelastic solid: we allow(i)the mass density to be
Electrical impedance tomography aims at estimating conductivity distribution inside a body from current/voltage measurements from the boundary.The estimation can be done sequentially,either because of
Novel Krylov-subspace algorithms were developed for massively parallel quantum material simulations or electronic structure calculations.The method solves the generalized shifted linear equations((zS-
The aim of this paper is to study some properties of the generalized incomplete hypergeometric functions.Here we establish two theorems which provides the images of this function under the generalized
The q-Laplace transforms of the basic analogue of H-function of two variables have been evaluated in the present paper.Special cases of the main results are also discussed.
The subject of fractional calculus has gained noticeable importance and popularity due to its established applications in many fields of science and engineering during the past three decades or so.