01109nlm 2200253Ia 450 99657957270331620240215073929.019840517d1642---- uy |engdrcnu<<A>> sermon preached at the funerall of the Honourable Sir Francis Vincent, Knight and baronet at Stokedawbernon in the county of Surrey, the tenth day of Apill [sic], 1640by Thomas Neesham. clerke and rector of the same churchLondonPrinted by Tho. Brudenell for John Benson and are to be sold at his shop1642Testo elettronico (PDF) ([6], 27 p.)Base dati testualeRiproduzione dell'originale nella Harvard University Library.FuneraliSermoniBNCF252.1NEESHAM,Thomas1589255ITcbaREICAT996579572703316EBERSermon preached at the funerall of the Honourable Sir Francis Vincent, Knight and baronet at Stokedawbernon in the county of Surrey, the tenth day of Apill , 16403884157UNISA02843nam 2200565 a 450 991048415890332120200520144314.09783642184291364218429410.1007/978-3-642-18429-1(CKB)2670000000076213(SSID)ssj0000506043(PQKBManifestationID)11313332(PQKBTitleCode)TC0000506043(PQKBWorkID)10513962(PQKB)10781943(DE-He213)978-3-642-18429-1(MiAaPQ)EBC3066565(PPN)151591342(EXLCZ)99267000000007621320110307d2011 uy 0engurnn#008mamaatxtccrEigenvalues, embeddings and generalised trigonometric functions /Jan Lang, David Edmunds1st ed. 2011.Berlin Springer20111 online resource (XI, 220 p. 10 illus.)Lecture notes in mathematics,0075-8434 ;2016Bibliographic Level Mode of Issuance: Monograph9783642182679 3642182674 Includes bibliographical references and index.1 Basic material -- 2 Trigonometric generalisations -- 3 The Laplacian and some natural variants -- 4 Hardy operators -- 5 s-Numbers and generalised trigonometric functions -- 6 Estimates of s-numbers of weighted Hardy operators -- 7 More refined estimates -- 8 A non-linear integral system -- 9 Hardy operators on variable exponent spaces.The main theme of the book is the study, from the standpoint of s-numbers, of integral operators of Hardy type and related Sobolev embeddings. In the theory of s-numbers the idea is to attach to every bounded linear map between Banach spaces a monotone decreasing sequence of non-negative numbers with a view to the classification of operators according to the way in which these numbers approach a limit: approximation numbers provide an especially important example of such numbers. The asymptotic behavior of the s-numbers of Hardy operators acting between Lebesgue spaces is determined here in a wide variety of cases. The proof methods involve the geometry of Banach spaces and generalized trigonometric functions; there are connections with the theory of the p-Laplacian.Lecture notes in mathematics (Springer-Verlag) ;2016.Trigonometrical functionsTrigonometrical functions.515Lang Jan478954Edmunds David510955MiAaPQMiAaPQMiAaPQBOOK9910484158903321Eigenvalues, embeddings and generalised trigonometric functions767858UNINA