The following pages link to (Q4971100):
Displaying 21 items.
- Boundary-value problems with displacement for a degenerate fourth-order hyperbolic equation (Q909888) (← links)
- The first boundary value problem for \(-u''=\lambda u\) p (Q1104468) (← links)
- Analysis and explicit solvability of degenerate tensorial problems (Q1689782) (← links)
- Nonlocal boundary-value problem for a third-order parabolic-hyperbolic equation with degeneration of type and order in the hyperbolicity domain (Q2206258) (← links)
- Boundary-value problem for a third-order hyperbolic equation that is degenerate inside a domain and contains the aller operator in the principal part (Q2206268) (← links)
- Problem with an analog of the Bitsadze-Samaraskii condition for one class of degenerate hyperbolic equations (Q2678465) (← links)
- A boundary value problem of the first kind for some nonlinear differential equations with degeneration on manifolds of arbitrary dimensions (Q2703858) (← links)
- (Q3679601) (← links)
- (Q4242491) (← links)
- (Q4300751) (← links)
- THE INITIAL-BOUNDARY VALUE PROBLEM FOR THE FIRST ORDER DEGENERATED HYPERBOLIC SYSTEM (Q4488693) (← links)
- (Q4559094) (← links)
- (Q4624989) (← links)
- Краевая задача для гиперболического уравнения третьего порядка с вырождением порядка внутри области (Q4961707) (← links)
- Задача со смещением для вырождающегося внутри области гиперболического уравнения (Q4962288) (← links)
- Задача со смещением для вырождающегося гиперболического уравнения первого рода (Q4986133) (← links)
- Internal boundary value problems with displacement for the mixed-wave equation (Q5071752) (← links)
- On a method for solving a mixed boundary value problem for a parabolic equation using modified sinc-approximation operators (Q6053562) (← links)
- A method for solution of a mixed boundary value problem for a hyperbolic type equation using the operators $\mathbb{AT}_{\lambda,j}$ (Q6184508) (← links)
- Nonlocal problems with displacement for matching two second order hyperbolic equations (Q6553346) (← links)
- On one method for solving a mixed boundary value problem for a parabolic type equation using operators \( \mathbb{A}{{\mathbb{T}}_{{\lambda ,j}}} \) (Q6558951) (← links)
