Add to ORKGLet Abe a simply connected domain in the extended plane, conformally equiva-lent to the unit disc. Denote by M(A) the set of locally injective meromorphic func-tions in A and by q, the density of the Poincard metric in l, so normalized that qa(h()lh'(z)l: (2rm z)-&apos
In this article we establish the maximum radius of the disc which any univalent in the half‐plane fu...
Abstract. In this article, we study the (d−1)-volume and the covering numbers of the medial axis of ...
We show some relations among the volumes of domains in Euclidean spaces, their surface areas and the...
Let A be a domain in the extended complex plane, conformally equivalent to a disc. We denote by pnld...
},et Abe a quasidisc. Denote by g, the density of the Poincard metric in l, so normalized that pr(x ...
Let f (z) be a holomorphic function defined on unit disc U: {z: lrl < 1} and.Sy: (f " lf&apo...
ABSTRACT. The inner radius of univalence of a domain $D $ with Poincar\’e density $\rho_{D} $ is the...
Let D denote the open unit disc and f : D → ℂ̄ be meromorphic and injective in D. We assume that f i...
Let f be a locally injective mapping of a simply connected hyperbolic domain D into $\bar\doubc$. Un...
Let ( ) 22......f z z a z = + + be analytic and ( ) 22......g z z b z = + + is univalent in the uni...
We consider certain inequalities among the Apollonian metric, the Apollonian inner metric, the $j$ m...
Abstract. The univalent Bloch-Landau constant U is the largest number such the image of the unit dis...
© 2018, © 2018 Informa UK Limited, trading as Taylor & Francis Group. For a plane domain we study ...
The radius of univalence is found for the convolution f∗g of functions f∈S (normalized univalent fun...
Let Ω ⊂ ℂ̄ and Π ⊂ ℂ̄ be two domains equipped by the Poincaré metric. We are concerned with the set ...
In this article we establish the maximum radius of the disc which any univalent in the half‐plane fu...
Abstract. In this article, we study the (d−1)-volume and the covering numbers of the medial axis of ...
We show some relations among the volumes of domains in Euclidean spaces, their surface areas and the...
Let A be a domain in the extended complex plane, conformally equivalent to a disc. We denote by pnld...
},et Abe a quasidisc. Denote by g, the density of the Poincard metric in l, so normalized that pr(x ...
Let f (z) be a holomorphic function defined on unit disc U: {z: lrl < 1} and.Sy: (f " lf&apo...
ABSTRACT. The inner radius of univalence of a domain $D $ with Poincar\’e density $\rho_{D} $ is the...
Let D denote the open unit disc and f : D → ℂ̄ be meromorphic and injective in D. We assume that f i...
Let f be a locally injective mapping of a simply connected hyperbolic domain D into $\bar\doubc$. Un...
Let ( ) 22......f z z a z = + + be analytic and ( ) 22......g z z b z = + + is univalent in the uni...
We consider certain inequalities among the Apollonian metric, the Apollonian inner metric, the $j$ m...
Abstract. The univalent Bloch-Landau constant U is the largest number such the image of the unit dis...
© 2018, © 2018 Informa UK Limited, trading as Taylor & Francis Group. For a plane domain we study ...
The radius of univalence is found for the convolution f∗g of functions f∈S (normalized univalent fun...
Let Ω ⊂ ℂ̄ and Π ⊂ ℂ̄ be two domains equipped by the Poincaré metric. We are concerned with the set ...
In this article we establish the maximum radius of the disc which any univalent in the half‐plane fu...
Abstract. In this article, we study the (d−1)-volume and the covering numbers of the medial axis of ...
We show some relations among the volumes of domains in Euclidean spaces, their surface areas and the...