Abstract:
We study the Tricomi problem for the functional-differential mixed-compound equation $LQu(x,y)=0$ in the class of twice continuously differentiable solutions.
Here $L$ is a differential-difference operator of mixed parabolic-elliptic type with Riemann–Liouville fractional derivative and linear shift by $y$.
The $Q$ operator includes multiple functional delays and advances $a_1(x)$ and $a_2(x)$ by $x$.
The functional shifts $a_1(x)$ and $a_2(x)$ are the orientation preserving mutually inverse diffeomorphisms.
The integration domain is $D=D^+\cup D^-\cup I$.
The “parabolicity” domain $D^+$ is the set of $(x,y)$ such that $x_0<x<x_3$, $y>0$.
The ellipticity domain is $D^-=D_0^-\cup D_1^-\cup D_2^-$, where $D_k^-$ is the set of $(x,y)$ such that $x_k<x<x_{k+1}$, $-\rho_k(x)<y<0$, and $\rho_k=\sqrt{a_1^k(x)(x_1-a_1^k(x))}$, $\rho_k(x)=\rho_0(a_1^k(x))$, $k=0, 1, 2$.
A general solution to this Tricomi problem is found. The uniqueness and existence theorems are proved.
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