6 edition of Coefficient regions for schlicht functions found in the catalog.
Coefficient regions for schlicht functions
Albert Charles Schaeffer
Bibliography: p. 304-305.
|Statement||by A. C. Schaeffer and D. C. Spencer. With a chapter on The region of values of the derivative of a schlicht function, by Arthur Grad.|
|Series||Colloquium publications,, v. 35, Colloquium publications (American Mathematical Society) ;, v. 35.|
|LC Classifications||QA1 .A5225 vol. 35|
|The Physical Object|
|Pagination||xi, 311 p.|
|Number of Pages||311|
|LC Control Number||51000944|
In this work, the bounds for the logarithmic coefficients γ n of the general classes S * (φ) and K (φ) were estimated. It is worthwhile mentioning that the given bounds would generalize some of the previous papers. Some consequences of the main results are also presented, noting that our method is more general than those used by by: 2. This banner text can have markup.. web; books; video; audio; software; images; Toggle navigation.
Montel, P., Leçons sur les fonctions univalentes ou multivantes, GauthierVillars, Paris (1 9 3 3) 4 9. Schaeffer, A.C. and Spencer, D.C., Coefficient regions for schlicht functions, Colloquium Publications 3 5, American Mathematical Society, N e w York (1 9 5 0) 5 : I.N. Sneddon. B. Bhowmik and S. Ponnusamy, Coefficient inequalities for concave and meromorphically starlike univalent functions, Ann. Polon. Math. 93 (), – B. Bhowmik, S. Ponnusamy and K.-J. Wirths, Unbounded convex polygons, Blaschke products and concave schlicht functions, Indian Journal of Mathematics 50 (2)(), –
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Get this from a library. Coefficient Regions for Schlicht Functions. [A C Schaeffer; D C Spencer] -- Instead of investigating various isolated extremal problems in the theory of schlicht functions, the authors have concentrated their efforts on the investigation of the family of extremal schlicht.
OCLC Number: Notes: Comprend un chap.: " The region of values of the derivative of a Schlicht function " par Arthur Grad. Bibliogr. Coefficient Regions for Schlicht Functions Base Product Code Keyword List: coll ; COLL ; coll/35 ; COLL/35 ; coll ; COLL Print Product Code: COLL/S.
Title: Coefficient Regions for Schlicht Functions Volume 35 of American Mathematical Society: American Mathematical Society colloquium publications.
: Coefficient Regions for Schlicht Functions (COLLOQUIUM PUBLICATIONS (AMER MATHEMATICAL SOC)) (): A. Schaeffer, D.C. Spencer, and A. Grad. Abstract. While colleagues at Stanford in the s, Albert Schaeffer and Donald Spencer produced a series of papers on coefficient regions for schlicht (= univalent) functions, culminating in their well-known book (Schaeffer and Spencer, Author: Peter Duren.
A. Schaeffer and D. Spencer, Coefficient Regions for Schlicht Functions, Amer. Math. Soc. Coll. Publ. vol. 35, Google ScholarCited by: 4.
Biography. Schaeffer was the son of Albert John and Mary Plane Schaeffer (née Herrick). He studied civil engineering at the University of Wisconsin, Madison (bachelor's degree ) and was from to employed as a highway engineer. In he received a PhD in mathematics under Eberhard Hopf at to he was an instructor at Purdue.
Faber polynomials in the theory of univalent functions Commentary by Peter Duren (with P. Garabedian) Identities in the theory of conformal mapping Commentary by Brad Osgood (with A.
Schaeffer and D. Spencer) The coefficient regions of. The Robin function R is the fundamental solution of a mixed boundary value problem in the complex plane, where Dirichlet conditions are posed on one part of Author: Bodo Dittmar.
35 A. SchaefFer and D. Spencer, Coefficient regions for Schlicht functions, 34 J. Walsh, The location of critical points of analytic and harmonic functions, 33 J. Ritt, Differential algebra, A coefficient inequality for Bloch functions with applications to uniformly locally univalent functions Article in Monatshefte für Mathematik (2) February with 29 Reads.
Menahem Max Schiffer: Selected Papers: v. 1 by Peter Duren,available at Book Depository with free delivery worldwide. Donald Clayton Spencer (Ap – Decem ) was an American mathematician, known for work on deformation theory of structures arising in differential geometry, and on several complex variables from the point of view of partial differential was born in Boulder, Colorado, and educated at the University of Colorado and MITAlma mater: University of Colorado, MIT.
Bernardi, A bibliography of schlicht functions, New York University, Courant Institute of Mathematical Sciences, Mathematical Reviews (MathSciNet): MR Zentralblatt MATH: by: M. Schiffer, the dominant figure in geometric function theory in the second half of the twentieth century, was a mathematician of exceptional breadth, whose work ranged over such areas as univalent functions, conformal mapping, Riemann surfaces, partial.
Their joint publications began in and included papers such as The coefficient regions of schlicht functions () (which also had A C Schaeffer as a co-author), The coefficient problem for multiply-connected domains (), A variational calculus for Riemann surfaces () and Some remarks on variational methods applicable to multiply.
Coefficient regions for Schlicht functions QA W Vol. 58 Shahidi, Freydoon Eisenstein series and automorphic L-functions QAA9 S Vol. 33 Ritt, Joseph Fels Differential algebra The book of involutions. One of the world's leading journals in its field, it publishes articles about the teaching and learning of mathematics, with a focus on the age range, and expositions of attractive areas of mathematics.
Regular sections include letters, extensive book reviews and a problem corner. Coefficient Regions. Boundary Points THE COEFFICIENT PROBLEM FOR SCHLICHT MAPPINGS OF THE EXTERIOR OF THE UNIT CIRCLE GEORGE SPRINGER Let E(q) represent the domain consisting of the whole Appears in 18 books from Page - Some new properties of support points for compact families of univalent functions 5/5(1).
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