Bitsadze-Lavrent'ev problem
Tricomi–Bitsadze–Lavrent'ev problem
The problem of finding a function 
which satisfies
 | (a1) |
in a mixed domain that is simply connected and bounded by a Jordan (non-self-intersecting) "elliptic" arc 
(for 
) with end-points 
and 
and by the "real" characteristics (for 
)
 |
of the Bitsadze–Lavrent'ev equation (a1), which satisfy the characteristic equation
 |
and meet at the point 
, and which assumes prescribed continuous boundary values
 | (a2) |
where 
is the arc length reckoned from the point 
and
 |
Consider the aforementioned domain (denoted by 
). Then a function 
is a regular solution of the Bitsadze–Lavrent'ev problem if it satisfies the following conditions:
1) 
is continuous in 
, 
;
2) 
are continuous in 
(except, possibly, at the points 
and 
, where they may have poles of order less than 
, i.e., they may tend to infinity with order less than 
as 
and 
);
3) 
, 
are continuous in 
(except possibly on 
, where they need not exist);
4) 
satisfies (a1) at all points 
(i.e., 
without 
);
5) 
satisfies the boundary conditions (a2).
Consider the normal curve (of Bitsadze–Lavrent'ev)
 |
Note that it is the upper semi-circle and can also be given by (the upper part of)
 |
where 
. The curve 
contains 
in its interior.
The idea of A.V. Bitsadze and M.A. Lavrent'ev for finding regular solutions of the above problem is as follows. First, solve the problem N (in 
, 
). That is, find a regular solution of equation (a1) satisfying the boundary conditions:
on 
;
on 
, where 
is continuous for 
, 
, and may tend to infinity of order less than 
as 
and 
.
Secondly, solve the Cauchy–Goursat problem (in 
, 
). That is, find a regular solution of (a1) satisfying the boundary conditions:
on 
;
on 
, where 
is continuous for 
, 
, and may tend to infinity of order less that 
as 
and 
.
Finally, take into account the boundary condition
 |
Therefore, one has a Goursat problem (in 
, 
) for (a1) with boundary conditions:
on 
;
on 
.
Several extensions and generalizations of the above boundary value problem of mixed type have been established [a3], [a4], [a5], [a6], [a7], [a8]. These problems are important in fluid mechanics (aerodynamics and hydrodynamics, [a1], [a2]).
References
| [a1] | A.V. Bitsadze, "Equations of mixed type" , Macmillan (1964) (In Russian) |
| [a2] | C. Ferrari, F.G. Tricomi, "Transonic aerodynamics" , Acad. Press (1968) (Translated from Italian) |
| [a3] | J.M. Rassias, "Mixed type equations" , 90 , Teubner (1986) |
| [a4] | J.M. Rassias, "Lecture notes on mixed type partial differential equations" , World Sci. (1990) |
| [a5] | J.M. Rassias, "The Bitsadze–Lavrentjev problem" Bull. Soc. Roy. Sci. Liège , 48 (1979) pp. 424–425 |
| [a6] | J.M. Rassias, "The bi-hyperbolic Bitsadze–Lavrentjev–Rassias problem in three-dimensional Euclidean space" C.R. Acad. Sci. Bulg. Sci. , 39 (1986) pp. 29–32 |
| [a7] | J.M. Rassias, "The mixed Bitsadze–Lavrentjev–Tricomi boundary value problem" , Texte zur Mathematik , 90 , Teubner (1986) pp. 6–21 |
| [a8] | J.M. Rassias, "The well posed Tricomi–Bitsadze–Lavrentjev problem in the Euclidean plane" Atti. Accad. Sci. Torino , 124 (1990) pp. 73–83 |
Bitsadze-Lavrent'ev problem. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Bitsadze-Lavrent%27ev_problem&oldid=22131