Book contents
- Frontmatter
- Contents
- Preface
- Part I Contributions of participants
- A minimal-area problem in conformal mapping
- A remark on schlicht functions with quasiconformal extensions
- Some extremal problems for univalent functions, harmonic measures, and subharmonic functions
- On coefficient problems for certain power series
- Approximation by analytic functions uniformly continuous on a set
- A meromorphic function with assigned Nevanlinna deficiencies
- Estimation of coefficients of univalent functions by Tauberian remainder theorems
- The Padé table of functions having a finite number of essential singularities
- Extremal problems of the cos πρ-type
- A cos πλ-problem and a differential inequality
- Applications of Denjoy integral inequalities to growth problems for subharmonic and meromorphic functions
- A theorem on mini |z| log|f(z) |/T(r, f)
- The Lp-integrability of the partial derivatives of a quasiconformal mapping
- A Hilbert space method in the theory of schlicht functions
- An extremal problem concerning entire functions with radially distributed zeros
- Local behavior of subharmonic functions
- A general form of the annulus theorem
- Two problems on HP spaces
- Approximation on curves by linear combinations of exponentials
- Two results on means of harmonic functions
- The Fatou limits of outer functions
- A proof of |a4| ≤ 4 by Loewner's method
- Completeness questions and related Dirichlet polynomials
- On the boundary behaviour of normal functions
- Joint approximation in the complex domain
- Some linear operators in function theory
- Analogues of the elliptic modular functions in R3
- On some phenomena and problems of the powersum-method
- Meromorphic functions with large sums of deficiencies
- On D. J. Patil's remarkable generalisation of Cauchy's formula
- Analytic functions and harmonic analysis
- Part II Research problems in function theory
On D. J. Patil's remarkable generalisation of Cauchy's formula
from Part I - Contributions of participants
Published online by Cambridge University Press: 04 May 2010
- Frontmatter
- Contents
- Preface
- Part I Contributions of participants
- A minimal-area problem in conformal mapping
- A remark on schlicht functions with quasiconformal extensions
- Some extremal problems for univalent functions, harmonic measures, and subharmonic functions
- On coefficient problems for certain power series
- Approximation by analytic functions uniformly continuous on a set
- A meromorphic function with assigned Nevanlinna deficiencies
- Estimation of coefficients of univalent functions by Tauberian remainder theorems
- The Padé table of functions having a finite number of essential singularities
- Extremal problems of the cos πρ-type
- A cos πλ-problem and a differential inequality
- Applications of Denjoy integral inequalities to growth problems for subharmonic and meromorphic functions
- A theorem on mini |z| log|f(z) |/T(r, f)
- The Lp-integrability of the partial derivatives of a quasiconformal mapping
- A Hilbert space method in the theory of schlicht functions
- An extremal problem concerning entire functions with radially distributed zeros
- Local behavior of subharmonic functions
- A general form of the annulus theorem
- Two problems on HP spaces
- Approximation on curves by linear combinations of exponentials
- Two results on means of harmonic functions
- The Fatou limits of outer functions
- A proof of |a4| ≤ 4 by Loewner's method
- Completeness questions and related Dirichlet polynomials
- On the boundary behaviour of normal functions
- Joint approximation in the complex domain
- Some linear operators in function theory
- Analogues of the elliptic modular functions in R3
- On some phenomena and problems of the powersum-method
- Meromorphic functions with large sums of deficiencies
- On D. J. Patil's remarkable generalisation of Cauchy's formula
- Analytic functions and harmonic analysis
- Part II Research problems in function theory
Summary
According to a classical theorem of F. and M. Riesz, the values in the open unit disc of an analytic function f (z) of the Hardy class Hp are uniquely determined by the boundary values on a subset E of positive linear measure of the circumference. Patil's formula gives these values explicitly, and Cauchy's formula is the special case where the subset E reduces to the circumference itself. More recently Patil has extended his formula to functions of several complex variables on a poly disc. Patil has obtained these results by functional analysis, using operators and Toeplitz matrices. In the case of one complex variable, an elementary proof is possible, in fact it is at once suggested by the classical devices of Phragmen-Lindelöf, at least in the case where the subset in question consists of a finite sum of arcs. A simple way of passing from this special case to the general case has been given by Steve Wainger. The applications of these methods, and of the related methods of Albert Baernstein, are far-reaching.
One naturally thinks of the Goldbach problem: the Hardy-Little-wood attack amounts to estimating at the origin the nth derivative of a polynomial of degree 2n, which is well-behaved on most of the unit circumference (on the ‘major arcs’). However I shall limit myself to the case in which E reduces to a single arc. The formula in this case was almost obtained by Paley-Wiener. It provides, among other things, an automatic method of analytic continuation, of the same power as the Lindelöf method of summation of a divergent series.
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- Proceedings of the Symposium on Complex Analysis Canterbury 1973 , pp. 137 - 138Publisher: Cambridge University PressPrint publication year: 1974