by using 
We do this by using an explicit set of coordinates on the Schubert cell.


By using some topological arguments we prove thatF is always surjective.


This problem does not arise if f is continuous, and can be removed by using the standard summability methods.


We obtain these last estimates (more precisely, Hp/2estimates for h(f) by using a slight extension of the CoifmanMeyerStein theorem relating the socalled tentspaces and the Hardy spaces.


The uniform and local asymptotic properties of BH are proved by using wavelet methods.


The new wavelets used in [23] were designed from the Loop scheme by using ideas and methods of [26, 27], where orthogonal wavelets with exponential decay and prewavelets with compact support were constructed.


This quantitative structureactivity relationship (QSAR) study of flavones was carried by using selected quantum chemical descriptors.


In this paper, we construct the EB estimators of θ by using the kernel estimation of multivariate density function and its partial derivatives.


In this paper, by using the theory of semigroup and spectrum, a computation formula on the growth order of one class ofC0semigroups in Banach space is proved.


When data are randomly censored, the estimatorsβn* andgn* for β andg are obtained by using classK and the least square methods.


In this paper, the existence and uniqueness of solutions for boundary value problemx?=f(t, x, x', x″),x(0)=A,x'(0)=B,g(x'(1),x″(1))=0 are studied by using Volterra type operator and upper and lower solutions.


Under suitable conditions and by using the comparison theorem the existence and asymptotic behavior of solution for the boundary value problems are studied.


We determine allowed values ofθ associated with the givenα by using some new techniques.


This paper describes the local influence assessment for parameter inference of a statistical model by using curvatures associated with local divergence under a generic perturbation scheme.


Computing karmarkar's projections quickly by using matrix factorization


In this paper, we propose a mixed method for solving twodimensional unsteady vorticity equations by using Chebyshev spectralfinite element approximation.


We obtain the Holder exponents of such fractal interpolation functions by using the technique of operator approximation.


At last, we discuss the series expressions of these functions and give a Boxcounting dimension estimation of "critical" fractal interpolation functions by using our smoothness results.


Under suitable conditions, by using the comparison theorem, the existence and asymptotic behavior of solution for the boundary value problems are studied.


In [7], the author defined a matrix by using rnormal subdivision of the ndimensional unit cube, considered it a Markov matrix, and constructed the invariant set and invariant measure.

