FPDEFlame-Photometric Detector Electrometer
FPDEFinished Products Distribution Expense
FPDEFocal Point on Disaster Evaluation (Economic Commission for Latin America & the Caribbean)
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References in periodicals archive ?
In this paper, we propose a new fractional subequation method to establish exact solutions for fractional partial differential equations (FPDEs), which is based on the following fractional ordinary differential equation:
In Section 3, we give the description of the fractional subequation method for solving FPDEs. Then in Section 4 we apply this method to establish exact solutions for the space-time fractional generalized Hirota-Satsuma coupled KdV equations.
In this section, we give the main steps of the fractional subequation method for finding exact solutions for FPDEs.
Qatar University's (QU) Foundation Programme Department of English (FPDE), along with the Centre for Entrepreneurship (CFE), a centre under the College of Business and Economics (CBE), recently held 'The Entrepreneurial Showcase Event'.
'The Entrepreneurial Showcase Event' was an opportunity for the QU community to see the work that is being done at FPDE and how they are working with the CFE in using innovative learning methods to enhance students' communicative abilities in English and promoting entrepreneurial spirits.
In recent decades, fractional partial differential equations (FPDEs) [2] are widely used to describe engineering processes and dynamical systems; more and more researchers have devoted to study a variety of methods for solving fractional differential equations.
The methods based on the orthogonal functions [13-15] are powerful and wonderful for solving FPDEs and have achieved great success in this field.