01357    a2200193   450000500170000000800410001702000180005804100080007608200160008410000190010024500620011926000340018130000150021552007310023065000210096194200070098299900150098995201590100420260327151518.0260327b        |||||||| |||| 00| 0 eng d  a9781493908318  aeng  a512.7bRamT  aMurty, M. Ram   aTranscendental Numbers /cM.Ram Murty and Purusottam Rath  aNew York:bSpringer,c©2014.  axiv,217 p.  aThis book provides an introduction to the topic of transcendental numbers for upper-level undergraduate and graduate students. The text is constructed to support a full course on the subject, including descriptions of both relevant theorems and their applications. While the first part of the book focuses on introducing key concepts, the second part presents more complex material, including applications of Baker’s theorem, Schanuel’s conjecture, and Schneider’s theorem. These later chapters may be of interest to researchers interested in examining the relationship between transcendence and L-functions. Readers of this text should possess basic knowledge of complex analysis and elementary algebraic number theory,  aalgebra| numbers  cBK  c8165d8165  00102ddc40708MATaIITTPbIITTPcGENd2026-03-26g4178.96iIN36763/25-26l0o512.7 MurT (12536)p12536r2026-04-21 00:00:00t1v7598.11w2026-03-26yBK