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Shaktawat, Vinodini,Pothan, Laly A.,Saxena, N.S.,Sharma, Kananbala,Sharma, T.P. The Korean Society for Composite Materials 2008 Advanced composite materials Vol.17 No.1
Using a Dynamic Mechanical Analyzer (DMA), mechanical properties like modulus and phase transition temperature of polyester composites of banana fibers (treated and untreated) are measured simultaneously. The shifting of phase transition temperature is observed in some treatments. The performance of the composite depends to a large extent on the adhesion between polymer matrix and the reinforcement. This is often achieved by surface modification of the matrix or the filler. Banana fiber was modified chemically to achieve improved interfacial interaction between the fiber and the polyester matrix. Various silanes and alkalies were used to modify the fiber surface. Chemical modification was found to have a profound effect on the fiber/matrix interaction, which is evident from the values of phase transition temperatures. Of the various chemical treatments, simple alkali treatment with 1% NaOH was found to be the most effective.
GENERALIZED FRACTIONAL DIFFERINTEGRAL OPERATORS OF THE K-SERIES
Gupta, Rajeev Kumar,Shaktawat, Bhupender Singh,Kumar, Dinesh The Honam Mathematical Society 2017 호남수학학술지 Vol.39 No.1
In the present paper, we further study the generalized fractional differintegral (integral and differential) operators involving Appell's function $F_3$ introduced by Saigo-Maeda [9], and are applied to the K-Series defined by Gehlot and Ram [3]. On account of the general nature of our main results, a large number of results obtained earlier by several authors such as Ram et al. [7], Saxena et al. [14], Saxena and Saigo [15] and many more follow as special cases.
Certain results on extended generalized $\tau$-Gauss Hypergeometric function
Dinesh Kumar,Rajeev Kumar Gupta,Bhupender Singh Shaktawat 호남수학회 2016 호남수학학술지 Vol.38 No.4
The main aim of this paper is to introduce an extension of the generalized $\tau$-Gauss hypergeometric function $_rF_s^{\tau}(z)$ and investigate various properties of the new function such as integral representations, derivative formulas, Laplace transform, Mellin transform and fractional calculus operators. Some of the interesting special cases of our main results have been discussed.
GENERALIZED FRACTIONAL DIFFERINTEGRAL OPERATORS OF THE K-SERIES
( Rajeev Kumar Gupta ),( Bhupender Singh Shaktawat ),( Dinesh Kumar ) 호남수학회 2017 호남수학학술지 Vol.39 No.1
In the present paper, we further study the generalized fractional differintegral (integral and differential) operators involving Appell`s function F3 introduced by Saigo-Maeda [9], and are applied to the K-Series defined by Gehlot and Ram [3]. On account of the general nature of our main results, a large number of results obtained earlier by several authors such as Ram et al. [7], Saxena et al. [14], Saxena and Saigo [15] and many more follow as special cases.
CERTAIN RESULTS ON EXTENDED GENERALIZED τ-GAUSS HYPERGEOMETRIC FUNCTION
Kumar, Dinesh,Gupta, Rajeev Kumar,Shaktawat, Bhupender Singh The Honam Mathematical Society 2016 호남수학학술지 Vol.38 No.4
The main aim of this paper is to introduce an extension of the generalized ${\tau}$-Gauss hypergeometric function $_rF^{\tau}_s(z)$ and investigate various properties of the new function such as integral representations, derivative formulas, Laplace transform, Mellin trans-form and fractional calculus operators. Some of the interesting special cases of our main results have been discussed.
CERTAIN RESULTS ON EXTENDED GENERALIZED T-GAUSS HYPERGEOMETRIC FUNCTION
( Dinesh Kumar ),( Rajeev Kumar Gupta ),( Bhupender Singh Shaktawat ) 호남수학회 2016 호남수학학술지 Vol.38 No.4
The main aim of this paper is to introduce an extension of the generalized ¿-Gauss hypergeometric function and in- vestigate various properties of the new function such as integral rep- resentations, derivative formulas, Laplace transform, Mellin trans- form and fractional calculus operators. Some of the interesting special cases of our main results have been discussed.
Dinesh Kumar,R.K.Gupta,B.S.Shaktawat,최준상 장전수학회 2017 Proceedings of the Jangjeon mathematical society Vol.20 No.4
The object of this paper is to establish four formulas for the Saigo-Maeda fractional calculus operators associated with product of the Aleph-function and the general class of polynomials (Srivastava polynomials), which are expressed in terms of the Aleph-function of two variables. Since the involved fractional calculus operators, the Alephfunction, and the Srivastava polynomials are very general, the main results here can be specialized to yield a large number of formulas for fractional calculus operators involving various special functions and polynomials. Here some special cases are demonstrated.