Multidimensional Inverse Problems for Differential EquationsSpringer, 15 Kas 2006 - 58 sayfa |
Kitabın içinden
32 sonuçtan 1-5 arası sonuçlar
Sayfa
... Problem of Determining a Function from Integrals over Ellipsoids of Revolution 2. Generalization to Analytic Curves 2 10 3. Problem of Determining a Function inside a Circle from ... inverse problem for a differential equation is any.
... Problem of Determining a Function from Integrals over Ellipsoids of Revolution 2. Generalization to Analytic Curves 2 10 3. Problem of Determining a Function inside a Circle from ... inverse problem for a differential equation is any.
Sayfa
... and [ 9 ] functions were constructed for some multidimensional inverse problems of quantum scattering theory that are similar to the GEL FAND - LEVITAN functions occurring in the inverse problem for the STURM - LIOUVILLE equation . This.
... and [ 9 ] functions were constructed for some multidimensional inverse problems of quantum scattering theory that are similar to the GEL FAND - LEVITAN functions occurring in the inverse problem for the STURM - LIOUVILLE equation . This.
Sayfa
M. M. Lavrentiev, V. G. Romanov, V. G. Vasiliev. inverse problem for the STURM - LIOUVILLE equation . This monograph investigates a number of ... inverse problem . CHAPTER 1 Some Problems of Integral Geometry In accordance with.
M. M. Lavrentiev, V. G. Romanov, V. G. Vasiliev. inverse problem for the STURM - LIOUVILLE equation . This monograph investigates a number of ... inverse problem . CHAPTER 1 Some Problems of Integral Geometry In accordance with.
Sayfa 1
... problem is any problem involving the determination of a function defined in a domain through its integrals along a family of curves in the domain . One of the earliest and most familiar versions of such problems is the determination of ...
... problem is any problem involving the determination of a function defined in a domain through its integrals along a family of curves in the domain . One of the earliest and most familiar versions of such problems is the determination of ...
Sayfa 2
... problem of reconstructing a function of n variables from its inte- grals over ellipsoids of revolution . In Section 2 the results of Section 1 are generalized to curves of a more general nature a special case being that of ellipses ...
... problem of reconstructing a function of n variables from its inte- grals over ellipsoids of revolution . In Section 2 the results of Section 1 are generalized to curves of a more general nature a special case being that of ellipses ...
İçindekiler
1 | |
Linearized Inverse Dynamic Problem for the Telegraph | 22 |
Derivation of a Nonlinear Differential Equation for | 31 |
CHAPTER 4 | 39 |
CHAPTER 5 | 52 |
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 belong boundary conditions CAUCHY data chapter consider const construct 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 f(x,y functions u(r fundamental solution given GREEN'S function half-plane half-space HÖLDER condition hyperplane inequality 16 initial and boundary integral equation integral geometry integral-geometric problem Introduce the notation Inverse Kinematic Inverse Kinematic Problem inversion formula kernel L₁(D linearized inverse problem M₁ mean values multidimensional inverse problems obtain operator L defined parameters polar problem for equation problem of determining Q₂ R₂ relations right-hand side second kind sense of HADAMARD SM,t solution to equation space STURM-LIOUVILLE equations 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 ду