Item Successfully Added to Cart
An error was encountered while trying to add the item to the cart. Please try again.
OK
Please make all selections above before adding to cart
OK
Share this page via the icons above, or by copying the link below:
Copy To Clipboard
Successfully Copied!
Twelve Papers on Real and Complex Function Theory
 
Twelve Papers on Real and Complex Function Theory
Hardcover ISBN:  978-0-8218-1788-9
Product Code:  TRANS2/88
List Price: $175.00
MAA Member Price: $157.50
AMS Member Price: $140.00
eBook ISBN:  978-1-4704-3299-7
Product Code:  TRANS2/88.E
List Price: $165.00
MAA Member Price: $148.50
AMS Member Price: $132.00
Hardcover ISBN:  978-0-8218-1788-9
eBook: ISBN:  978-1-4704-3299-7
Product Code:  TRANS2/88.B
List Price: $340.00 $257.50
MAA Member Price: $306.00 $231.75
AMS Member Price: $272.00 $206.00
Twelve Papers on Real and Complex Function Theory
Click above image for expanded view
Twelve Papers on Real and Complex Function Theory
Hardcover ISBN:  978-0-8218-1788-9
Product Code:  TRANS2/88
List Price: $175.00
MAA Member Price: $157.50
AMS Member Price: $140.00
eBook ISBN:  978-1-4704-3299-7
Product Code:  TRANS2/88.E
List Price: $165.00
MAA Member Price: $148.50
AMS Member Price: $132.00
Hardcover ISBN:  978-0-8218-1788-9
eBook ISBN:  978-1-4704-3299-7
Product Code:  TRANS2/88.B
List Price: $340.00 $257.50
MAA Member Price: $306.00 $231.75
AMS Member Price: $272.00 $206.00
  • Book Details
     
     
    American Mathematical Society Translations - Series 2
    Volume: 881970; 325 pp
    MSC: Primary 26;
  • Table of Contents
     
     
    • Articles
    • S. M. Nikol′skiĭ — Some properties of differentiable functions defined on an $n$-dimensional open set
    • I. Ja. Guberman — On uniform convergence of convex functions in a closed domain
    • E. K. Godunova — Inequalities with convex functions
    • I. I. Eremin — On systems of inequalities with convex functions in the left sides
    • M. I. Red′kov — On coefficients of bounded univalent functions
    • Ja. S. Mirošničenko — On some extremal problems in the theory of univalent functions
    • A. A. Gol′dberg — An integral with respect to a semiadditive measure and its application to the theory of entire functions. I
    • A. A. Gol′dberg — An integral with respect to a semiadditive measure and its application to the theory of entire functions. II
    • A. A. Gol′dberg — An integral with respect to a semiadditive measure and its application to the theory of entire functions. III
    • A. A. Gol′dberg — An integral with respect to a semiadditive measure and its application to the theory of entire functions. IV
    • M. N. Šeremeta — On the connection between the growth of the maximum modulus of an entire function and the moduli of the coefficients of its power series expansion
    • L. I. Ronkin — Growth of entire functions of several complex variables
  • Requests
     
     
    Review Copy – for publishers of book reviews
    Permission – for use of book, eBook, or Journal content
    Accessibility – to request an alternate format of an AMS title
Volume: 881970; 325 pp
MSC: Primary 26;
  • Articles
  • S. M. Nikol′skiĭ — Some properties of differentiable functions defined on an $n$-dimensional open set
  • I. Ja. Guberman — On uniform convergence of convex functions in a closed domain
  • E. K. Godunova — Inequalities with convex functions
  • I. I. Eremin — On systems of inequalities with convex functions in the left sides
  • M. I. Red′kov — On coefficients of bounded univalent functions
  • Ja. S. Mirošničenko — On some extremal problems in the theory of univalent functions
  • A. A. Gol′dberg — An integral with respect to a semiadditive measure and its application to the theory of entire functions. I
  • A. A. Gol′dberg — An integral with respect to a semiadditive measure and its application to the theory of entire functions. II
  • A. A. Gol′dberg — An integral with respect to a semiadditive measure and its application to the theory of entire functions. III
  • A. A. Gol′dberg — An integral with respect to a semiadditive measure and its application to the theory of entire functions. IV
  • M. N. Šeremeta — On the connection between the growth of the maximum modulus of an entire function and the moduli of the coefficients of its power series expansion
  • L. I. Ronkin — Growth of entire functions of several complex variables
Review Copy – for publishers of book reviews
Permission – for use of book, eBook, or Journal content
Accessibility – to request an alternate format of an AMS title
Please select which format for which you are requesting permissions.