Carleman boundary value problem

A boundary value problem for analytic functions involving a shift which reverses the direction of traversing the boundary. It was first considered by T. Carleman [1]. Let $L$ be a simple closed Lyapunov curve (cf. Lyapunov surfaces and curves) in the complex $z$- plane and let $D$ be the finite domain bounded by $L$. Let $\alpha (t)$ be a given complex-valued function on $L$ inducing a one-to-one mapping of $L$ onto itself reversing the direction of traversing $L$ and satisfying additionally the Carleman condition:

$$\tag{* } \alpha [ \alpha (t)] = t,\ \ t \in L$$

(it is further supposed that the derivative $\alpha ^ \prime (t)$ satisfies a Hölder condition). Then the Carleman boundary value problem consists in finding a function $\Phi (z)$, analytic in $D$ except for a finite number of poles, continuous on $D \cup L$ and subject to the boundary condition

$$\Phi [ \alpha (t)] = \ G (t) \Phi (t) + g (t),\ \ t \in L,$$

where the functions $G (t)$ and $g (t)$ given on $L$ satisfy a Hölder condition and $G (t) \neq 0$ on $L$.

The Carleman boundary value problem has also been studied under the condition

$$\alpha ^ {m} (t) = t,\ \alpha ^ {1} (t) = \alpha (t),\ \ \alpha ^ {k} (t) = \ \alpha ( \alpha ^ {k - 1 } (t)),\ \ k = 2 \dots m,$$

which is more general than (*), and so has the Carleman boundary value problem for several unknown functions (see [2], [3]).

References