Abstract

We consider Zaremba type boundary value problem for the Laplace operator in the unit circle on the complex plane. Using the theorem on the exponential representation for solutions to equations with constant coefficients we indicate a way to find eigenvalues of the problem and to construct its eigenfunctions.

Full Text
Published version (Free)

Talk to us

Join us for a 30 min session where you can share your feedback and ask us any queries you have

Schedule a call

Similar Papers

Paper Title
Journal
Date
Author
On boundary behavior of solutions to elliptic systems in disks
Analysis and Mathematical Physics | VOL. 9
13 May 2019
Stabilization of a bipropellant liquid rocket motor
-
01 Jan 1952
Orthogonal polynomials in the complex plane and on the real line
Walter Van Assche
-
Walter Van AsscheWalter Van Assche
11 Mar 1997
О явном решении краевой задачи типа Неймана для обобщенных аналитических функций в единичном круге
-
03 Feb 2020
View more papers

More From: Complex Analysis and Operator Theory

Paper Title
Journal
Date
Author
On The Monotony of Struve Functions
Erhan Deniz ... Róbert Szász
Complex Analysis and Operator Theory | VOL. 18
Erhan Deniz, et. al.Erhan Deniz ... Róbert Szász
25 Jun 2024
Dirichlet Problem for Nonlinear Higher-Order Equations in Upper Half Plane
Pelin Ayşe Gökgöz
Complex Analysis and Operator Theory | VOL. 18
Pelin Ayşe GökgözPelin Ayşe Gökgöz
25 Jun 2024
A Gap Condition for the Zeros and Singularities of a Certain Class of Products
Szymon Ignaciuk ... Maciej Parol
Complex Analysis and Operator Theory | VOL. 18
Szymon Ignaciuk, et. al.Szymon Ignaciuk ... Maciej Parol
22 Jun 2024
Numerical Radius and Norm Bounds via the Moore-Penrose Inverse
Mohammad Sababheh ... Hamid Reza Moradi
Complex Analysis and Operator Theory | VOL. -
Mohammad Sababheh, et. al.Mohammad Sababheh ... Hamid Reza Moradi
21 Jun 2024
View more papers