Siberian Mathematical Journal

, Volume 30, Issue 4, pp 549–554 | Cite as

Class of problems of integral geometry on the plane

  • M. M. Lavrent'ev


Integral Geometry 
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Literature Cited

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    M. M. Lavrent'ev and A. L. Bukhgeim, “A class of operator equations of the first kind,” Funkts. Anal. Prilozhen.,7, No. 4, 44–53 (1973).Google Scholar
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    R. G. Mukhometov, “A problem of integral geometry,” Mat. Probl. Geofiz.,6, No. 2, 212–245 (1975).Google Scholar
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    V. G. Romanov, “Reconstruction of a function in terms of integrals over a family of curves,” Sib. Mat. Zh.,8, No. 5, 1206–1208 (1967).Google Scholar
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    V. G. Romanov, “A problem of integral geometry and the linearized inverse problem for a differential equation,” Sib. Mat. Zh.,10, No. 6, 1364–1374 (1969).Google Scholar
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    A. L. Bukhgeim, “Carleman estimates for Volterra operators and the uniqueness of inverse problems,” in: Nonclassical Problems of Mathematical Physics [in Russian], Vychisl. Tsentr. Sib. Otd. Akad. Nauk SSSR, Novosibirsk (1981), pp. 56–64.Google Scholar
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    Yu. E. Anikonov, “Quasimonotone operators,” Mat. Probl. Geofiz.,3, 86–99 (1972).Google Scholar

Copyright information

© Plenum Publishing Corporation 1990

Authors and Affiliations

  • M. M. Lavrent'ev

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