[{"language":[{"iso":"eng"}],"isi":1,"department":[{"_id":"10020"}],"doi":"10.1070/RM2009v064n06ABEH004652","issue":"6","status":"public","publication_status":"published","citation":{"dgps":"Bogachev, V.I., Krylov, N.V. & Röckner, M. (2009). Elliptic and parabolic equations for measures. *Russian Mathematical Surveys *, *64*(6), 973-1078. Turpion ; IOP. doi:10.1070/RM2009v064n06ABEH004652.

","bio1":"Bogachev VI, Krylov NV, Röckner M (2009)

Elliptic and parabolic equations for measures.

Russian Mathematical Surveys 64(6): 973-1078.","ieee":" V.I. Bogachev, N.V. Krylov, and M. Röckner, “Elliptic and parabolic equations for measures”, *Russian Mathematical Surveys *, vol. 64, 2009, pp. 973-1078.","apa_indent":"Bogachev, V. I., Krylov, N. V., & Röckner, M. (2009). Elliptic and parabolic equations for measures. *Russian Mathematical Surveys *, *64*(6), 973-1078. doi:10.1070/RM2009v064n06ABEH004652

","mla":"Bogachev, Vladimir I., Krylov, Nikolai V., and Röckner, Michael. “Elliptic and parabolic equations for measures”. *Russian Mathematical Surveys * 64.6 (2009): 973-1078.","chicago":"Bogachev, Vladimir I., Krylov, Nikolai V., and Röckner, Michael. 2009. “Elliptic and parabolic equations for measures”. *Russian Mathematical Surveys * 64 (6): 973-1078.

","harvard1":"Bogachev, V.I., Krylov, N.V., & Röckner, M., 2009. Elliptic and parabolic equations for measures. *Russian Mathematical Surveys *, 64(6), p 973-1078.","angewandte-chemie":"V. I. Bogachev, N. V. Krylov, and M. Röckner, “Elliptic and parabolic equations for measures”, *Russian Mathematical Surveys *, **2009**, *64*, 973-1078.","wels":"Bogachev, V. I.; Krylov, N. V.; Röckner, M. (2009): Elliptic and parabolic equations for measures *Russian Mathematical Surveys *,64:(6): 973-1078.","frontiers":"Bogachev, V. I., Krylov, N. V., and Röckner, M. (2009). Elliptic and parabolic equations for measures. *Russian Mathematical Surveys * 64, 973-1078.","apa":"Bogachev, V. I., Krylov, N. V., & Röckner, M. (2009). Elliptic and parabolic equations for measures. *Russian Mathematical Surveys *, *64*(6), 973-1078. doi:10.1070/RM2009v064n06ABEH004652","lncs":" Bogachev, V.I., Krylov, N.V., Röckner, M.: Elliptic and parabolic equations for measures. Russian Mathematical Surveys . 64, 973-1078 (2009).","default":"Bogachev VI, Krylov NV, Röckner M (2009)

*Russian Mathematical Surveys * 64(6): 973-1078.","ama":"Bogachev VI, Krylov NV, Röckner M. Elliptic and parabolic equations for measures. *Russian Mathematical Surveys *. 2009;64(6):973-1078."},"page":"973-1078","publisher":"Turpion ; IOP","type":"journal_article","external_id":{"isi":["000278425000001"]},"user_id":"89573","intvolume":" 64","date_updated":"2019-07-12T12:43:18Z","year":"2009","quality_controlled":"1","publication_identifier":{"issn":["0036-0279"]},"title":"Elliptic and parabolic equations for measures","publication":"Russian Mathematical Surveys ","date_created":"2010-10-14T09:03:33Z","volume":64,"_id":"1795496","abstract":[{"text":"This article gives a detailed account of recent investigations of weak elliptic and parabolic equations for measures with unbounded and possibly singular coefficients. The existence and differentiability of densities are studied, and lower and upper bounds for them are discussed. Semi-groups associated with second-order elliptic operators acting in L-p-spaces with respect to infinitesimally invariant measures are investigated.","lang":"eng"}],"keyword":["stationary distribution of a","diffusion process","transition probability","elliptic equation","parabolic equation"],"author":[{"last_name":"Bogachev","first_name":"Vladimir I.","full_name":"Bogachev, Vladimir I."},{"full_name":"Krylov, Nikolai V.","last_name":"Krylov","first_name":"Nikolai V."},{"first_name":"Michael","last_name":"Röckner","id":"10585","full_name":"Röckner, Michael"}],"article_type":"original"}]