AbstractIn this paper, we study some radii problems for certain classes of analytic functions. These results generalize some of the previously known radii problems such as the radius of convexity for starlikness and radius of quasi-convexity for close-to-convex functions. Also, it is shown that some of these radii are best possible
AbstractB. Mond and I. Smart (J. Math. Anal. Appl.136 (1988), 325–333) defined a kind of invexity an...
AbstractThe main purpose of this paper is to demonstrate that using modified Simpson’s quadrature ru...
AbstractWe apply a time evolution approach to the statistical mechanics of one and two dimensional s...
AbstractLet D<0 be the fundamental discriminant of an imaginary quadratic field, and h(D) its class ...
AbstractIn this paper, we study new generalized integral operators for the classes of p-valent funct...
AbstractFor all metric Hs with s>1/2, the heat measures on free loop groups have been constructed by...
AbstractLet Mθ be the mean operator on the unit sphere in Rn, n⩾3, which is an analogue of the Stekl...
AbstractWe establish the infinite product expansion for ∑n≧0anqn2. This is a corrected version of th...
AbstractThe article is concerned with the Bourgain, Brezis and Mironescu theorem on the asymptotic b...
AbstractIn this paper some new Hadamard-type inequalities for functions whose derivatives in absolut...
AbstractFor a positive Borel measure dμ, we prove that the constantγn(dν;dμ)≔supπ∈Pn⧹{0}∫−∞∞π2(x)dν(...
AbstractIn this paper, we obtain Fekete-Szegö inequalities for certain class of analytic p-valent fu...
AbstractWe give a strong converse inequality of type B in terms of unified K-functional Kλα(f,t2)(0⩽...
AbstractFirst we show that any hyperbolically harmonic (hyperharmonic) function in the unit ball B i...
AbstractThe present paper is a study of pseudo-Jacobi polynomials which have been defined on the pat...
AbstractB. Mond and I. Smart (J. Math. Anal. Appl.136 (1988), 325–333) defined a kind of invexity an...
AbstractThe main purpose of this paper is to demonstrate that using modified Simpson’s quadrature ru...
AbstractWe apply a time evolution approach to the statistical mechanics of one and two dimensional s...
AbstractLet D<0 be the fundamental discriminant of an imaginary quadratic field, and h(D) its class ...
AbstractIn this paper, we study new generalized integral operators for the classes of p-valent funct...
AbstractFor all metric Hs with s>1/2, the heat measures on free loop groups have been constructed by...
AbstractLet Mθ be the mean operator on the unit sphere in Rn, n⩾3, which is an analogue of the Stekl...
AbstractWe establish the infinite product expansion for ∑n≧0anqn2. This is a corrected version of th...
AbstractThe article is concerned with the Bourgain, Brezis and Mironescu theorem on the asymptotic b...
AbstractIn this paper some new Hadamard-type inequalities for functions whose derivatives in absolut...
AbstractFor a positive Borel measure dμ, we prove that the constantγn(dν;dμ)≔supπ∈Pn⧹{0}∫−∞∞π2(x)dν(...
AbstractIn this paper, we obtain Fekete-Szegö inequalities for certain class of analytic p-valent fu...
AbstractWe give a strong converse inequality of type B in terms of unified K-functional Kλα(f,t2)(0⩽...
AbstractFirst we show that any hyperbolically harmonic (hyperharmonic) function in the unit ball B i...
AbstractThe present paper is a study of pseudo-Jacobi polynomials which have been defined on the pat...
AbstractB. Mond and I. Smart (J. Math. Anal. Appl.136 (1988), 325–333) defined a kind of invexity an...
AbstractThe main purpose of this paper is to demonstrate that using modified Simpson’s quadrature ru...
AbstractWe apply a time evolution approach to the statistical mechanics of one and two dimensional s...
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