Add to ORKGFor a polynomial p(z) of degree n, we have obtained a refinement of the well known Bernstein\u27s inequality max|z|=1 |p(k)(z)| ≤ n(n -1)(n -2)(n -k+1) max|z|=1 |p(z)|
In this papers ,we use the control method of the maximal fractional integral and obtain t...
| A | = δN necessarily contains a non-trivial 3-term arithmetic progression. The purpose of this pap...
summary:We give some explicit values of the constants $C_{1}$ and $C_{2}$ in the inequality $C_{1}/{...
For a polynomial p(z) of degree n, we have obtained a refinement of the well known Bernstein\u27s in...
MSC 2010: 30C45The object of the present paper is to discuss some radius properties
AbstractLet f∈S, f be a close-to-convex function, fk(z)=[f(zk)]1/k. The relative growth of successiv...
AbstractIf p(z)=∑ν=0naνzν is a polynomial of degree n having all its zeros in |z|⩽k, k⩾1, then Govil...
In the present paper we establish direct and inverse local properties for the Szász-Durrmeyer operat...
We present variations on theorems of Mertens as special cases of Density Hypothesis. Moreover, we st...
We consider functions f, analytic in the unit disc and of the normalised form f(z)=z+∑k=2∞akzk . For...
AbstractIn this paper, we give direct, inverse and equivalence approximation theorems for the Bézier...
In this paper, a result of Bor [2] dealing with ${mid{C,alpha;beta}mid}_k$ summability factors has b...
In this paper we study combined Shepard-Lagrange univariate interpolation operator\[S_{n,\mu}^{L,m}(...
In this papers ,we use the control method of the maximal fractional integral and obtain t...
In this papers ,we use the control method of the maximal fractional integral and obtain t...
In this papers ,we use the control method of the maximal fractional integral and obtain t...
| A | = δN necessarily contains a non-trivial 3-term arithmetic progression. The purpose of this pap...
summary:We give some explicit values of the constants $C_{1}$ and $C_{2}$ in the inequality $C_{1}/{...
For a polynomial p(z) of degree n, we have obtained a refinement of the well known Bernstein\u27s in...
MSC 2010: 30C45The object of the present paper is to discuss some radius properties
AbstractLet f∈S, f be a close-to-convex function, fk(z)=[f(zk)]1/k. The relative growth of successiv...
AbstractIf p(z)=∑ν=0naνzν is a polynomial of degree n having all its zeros in |z|⩽k, k⩾1, then Govil...
In the present paper we establish direct and inverse local properties for the Szász-Durrmeyer operat...
We present variations on theorems of Mertens as special cases of Density Hypothesis. Moreover, we st...
We consider functions f, analytic in the unit disc and of the normalised form f(z)=z+∑k=2∞akzk . For...
AbstractIn this paper, we give direct, inverse and equivalence approximation theorems for the Bézier...
In this paper, a result of Bor [2] dealing with ${mid{C,alpha;beta}mid}_k$ summability factors has b...
In this paper we study combined Shepard-Lagrange univariate interpolation operator\[S_{n,\mu}^{L,m}(...
In this papers ,we use the control method of the maximal fractional integral and obtain t...
In this papers ,we use the control method of the maximal fractional integral and obtain t...
In this papers ,we use the control method of the maximal fractional integral and obtain t...
| A | = δN necessarily contains a non-trivial 3-term arithmetic progression. The purpose of this pap...
summary:We give some explicit values of the constants $C_{1}$ and $C_{2}$ in the inequality $C_{1}/{...