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It is shown that the simple offdiagonal bivariate quadratic HermitePadé form always defines a bivariate quadratic function and that this function is analytic in a neighbourhood of the origin.


A pad full of large pores will be used to deduce load capability, facilitating the free flow of the fluids through the pores.


The use of Padé approximation to eliminate nonuniformities of asymptotic expansions


It is shown in the present paper by some examples that Padé rearrangement of the perturbation series can eliminate the nonuniformities of asymptotic expansions.


The structure of the optimum solution is found on the basis of the gas lubrication approximation with and without constraints on the height of the bearing pad (pocket).


A simulation model of the detector on the basis of the measured padresponse function was proposed, compared to the experimental data, and used to calculate the twotrack resolution.


Study on the Determination of HeavyMetal Ions in Tobacco and Tobacco Additives by Microwave Digestion and HPLC with PAD Detecti


Algebraic properties of functional matrices arising in the constuction of graded Padé approximations are established.


The inverse spectral problem method, based on Lax pairs, on the theory of joint HermitePadé approximations, and on the SturmLiouville method for finite difference equations is used.


By using Padé approximations of the first kind, we obtain a lower bound for the absolute value of a linear form with integer coefficients from the values of polylogarithmic functions at rational points.


By using Padé approximations of the first kind, a lower bound for the modulus of a linear form with integer coefficients in the values of certain hypergeometric functions at a rational point are obtained.


It is also shown that, for any rational τ, the number of spurious poles of the diagonal Padé approximants of the hyperelliptic function Hq does not exceed one half of its genus.


In this paper, we use HermitePadé approximations of the second kind to obtain a lower bound for the absolute value of a linear form, with integer coefficients, in values of polylogarithmic functions at a rational point.


In this paper, we use HermitePadé approximations of the second kind to obtain a lower bound for the absolute value of a linear form, with integer coefficients, in values of polylogarithmic functions at a rational point.


For polylogarithms, we use HermitePadé approximations of the first type, invariant with respect to the Klein group.


An experimental estimation method based on the Padé approximation is proposed.


For threedimensional systems the dynamical critical exponent is found directly by employing the threeloop approximation with the PadéBorel summation technique.


For the case of the onestep replica symmetry breaking, fixed points of the renormalization group equations are found using the PadéBorel summing technique.


Renormalizationgroup equations are analyzed in the twoloop approximation by using the PadéBorel summation technique.


Renormalizationgroup equations are analyzed in the twoloop approximation by using the PadéBorel summation technique.

