Multidimensional Inverse Problems for Differential EquationsSpringer, 21 Ara 1970 - 59 sayfa |
Kitabın içinden
10 sonuçtan 1-3 arası sonuçlar
Sayfa 17
... namely , they are given by ( 12 ) , a resolvent may be con- structed for each such equation . As the result of inverting ( 11 ) , we obtain the set of formulas , ( 13 ) ų ( r ) = MV , 0 , ± 1 , ± ( k = 0 , 1 , 2 , ... ) wherein the M ...
... namely , they are given by ( 12 ) , a resolvent may be con- structed for each such equation . As the result of inverting ( 11 ) , we obtain the set of formulas , ( 13 ) ų ( r ) = MV , 0 , ± 1 , ± ( k = 0 , 1 , 2 , ... ) wherein the M ...
Sayfa 27
... namely , its limit there does not exist . However K ( t , n ) remains bounded in a neighborhood of the origin . Formula ( 15 ) leads to ( 15a ) K ( t , n ) = √n1n K1 ( t , n ) . The function K1 ( t , n ) is continuous together with its ...
... namely , its limit there does not exist . However K ( t , n ) remains bounded in a neighborhood of the origin . Formula ( 15 ) leads to ( 15a ) K ( t , n ) = √n1n K1 ( t , n ) . The function K1 ( t , n ) is continuous together with its ...
Sayfa 42
... namely , and F $ 2 , 12 ( 4,5 ) 11 ( w , t ) e - pt dt = Q11 ( w , p ) , ( 1 = 1,2 ) . The functions F11 12 and F are clearly continuous and bounded since f ( 5 , n ) EL1 ( D ) . Hence it follows that each of the equations in ( 11 ) has ...
... namely , and F $ 2 , 12 ( 4,5 ) 11 ( w , t ) e - pt dt = Q11 ( w , p ) , ( 1 = 1,2 ) . The functions F11 12 and F are clearly continuous and bounded since f ( 5 , n ) EL1 ( D ) . Hence it follows that each of the equations in ( 11 ) has ...
İçindekiler
CHAPTER | 1 |
Problem of Determining a Function inside a Circle from | 13 |
On the Problem of Determining a Function from Its Mean | 19 |
Telif Hakkı | |
4 diğer bölüm gösterilmiyor
Diğer baskılar - Tümünü görüntüle
Multidimensional Inverse Problems for Differential Equations M. M. Lavrentiev,V. G. Romanov,V. G. Vasiliev Metin Parçacığı görünümü - 1970 |
Multidimensional Inverse Problems for Differential Equations M. M. Lavrentiev,V. G. Romanov,V. G. Vasiliev Metin Parçacığı görünümü - 1970 |
Sık kullanılan terimler ve kelime öbekleri
absolutely integrable functions analytic function arbitrary belong boundary conditions CAUCHY data chapter consider const continuous function corresponding Denote derive determining a function differential equation domain earth's ellipses ellipsoid of revolution exists expression family of curves following theorem function u(r fundamental solution given GREEN'S function half-plane half-space HOLDER condition hyperplane inequality 16 initial and boundary integral equation integral geometry integral-geometric problem Introduce the notation inverse kinematic inverse kinematic problem inverse problem inversion formula kernel L₁ linearized inverse problem M₁ mean values multidimensional inverse problems n₁ obtain operator L defined parameters polar problem for equation problem of determining Q₂ R₁ R₂ relations right-hand side second kind SM,t solution to equation take FOURIER transforms telegraph equation travel-times two-parameter family u₁ M,M,t unique solution uniqueness theorem unit circle values over spheres variables VOLTERRA equation waves wxxx θε ду эф