Drinfeld Modules
Mihran Papikian
рдорд╛рд░реНрдЪ реирежреирей ┬╖ Graduate Texts in Mathematics рдкреБрд╕реНрддрдХ 296 ┬╖ Springer Nature
рдИ-рдкреБрд╕реНрддрдХ
526
рдкреЗрдЬ
reportрд░реЗрдЯрд┐рдВрдЧ рдЖрдгрд┐ рдкрд░реАрдХреНрд╖рдгреЗ рдпрд╛рдВрдЪреА рдкрдбрддрд╛рд│рдгреА рдХреЗрд▓реЗрд▓реА рдирд╛рд╣реА ┬ардЕрдзрд┐рдХ рдЬрд╛рдгреВрди рдШреНрдпрд╛
shoppingmodeрейрез рдорд╛рд░реНрдЪ рдкрд╛рд╕реВрди рдХрд┐рдорддреАрдордзреНрдпреЗ 29% рдШрд╕рд░рдг
рдпрд╛ рдИ-рдкреБрд╕реНрддрдХрд╛рд╡рд┐рд╖рдпреА
This textbook offers an introduction to the theory of Drinfeld modules, mathematical objects that are fundamental to modern number theory.
After the first two chapters conveniently recalling prerequisites from abstract algebra and non-Archimedean analysis, Chapter 3 introduces Drinfeld modules and the key notions of isogenies and torsion points. Over the next four chapters, Drinfeld modules are studied in settings of various fields of arithmetic importance, culminating in the case of global fields. Throughout, numerous number-theoretic applications are discussed, and the analogies between classical and function field arithmetic are emphasized.
Drinfeld Modules guides readers from the basics to research topics in function field arithmetic, assuming only familiarity with graduate-level abstract algebra as prerequisite. With exercises of varying difficulty included in each section, the book is designed to be used as the primary textbook for a graduate course on the topic, and may also provide a supplementary reference for courses in algebraic number theory, elliptic curves, and related fields. Furthermore, researchers in algebra and number theory will appreciate it as a self-contained reference on the topic.
After the first two chapters conveniently recalling prerequisites from abstract algebra and non-Archimedean analysis, Chapter 3 introduces Drinfeld modules and the key notions of isogenies and torsion points. Over the next four chapters, Drinfeld modules are studied in settings of various fields of arithmetic importance, culminating in the case of global fields. Throughout, numerous number-theoretic applications are discussed, and the analogies between classical and function field arithmetic are emphasized.
Drinfeld Modules guides readers from the basics to research topics in function field arithmetic, assuming only familiarity with graduate-level abstract algebra as prerequisite. With exercises of varying difficulty included in each section, the book is designed to be used as the primary textbook for a graduate course on the topic, and may also provide a supplementary reference for courses in algebraic number theory, elliptic curves, and related fields. Furthermore, researchers in algebra and number theory will appreciate it as a self-contained reference on the topic.
рд▓реЗрдЦрдХрд╛рд╡рд┐рд╖рдпреА
Mihran Papikian received his Ph.D. from the University of Michigan in 2003. After a post-doctoral position at Stanford University, he joined the Mathematics Department of the Pennsylvania State University as a tenure-track assistant professor in 2007, becoming full professor in 2020. His research interests lie in arithmetic geometry and number theory, with an emphasis on the theory of Drinfeld modules, modular varieties, and elliptic curves. He has taught graduate courses in algebra, number theory, and various specialized topics, including Drinfeld modules.
рдпрд╛ рдИ-рдкреБрд╕реНрддрдХрд▓рд╛ рд░реЗрдЯрд┐рдВрдЧ рджреНрдпрд╛
рддреБрдореНрд╣рд╛рд▓рд╛ рдХрд╛рдп рд╡рд╛рдЯрддреЗ рддреЗ рдЖрдореНрд╣рд╛рд▓рд╛ рд╕рд╛рдВрдЧрд╛.
рд╡рд╛рдЪрди рдорд╛рд╣рд┐рддреА
рд╕реНрдорд╛рд░реНрдЯрдлреЛрди рдЖрдгрд┐ рдЯреЕрдмрд▓реЗрдЯ
Android рдЖрдгрд┐ iPad/iPhone рд╕рд╛рдареА Google Play рдмреБрдХ рдЕтАНреЕрдк рдЗрдВрд╕реНтАНрдЯреЙрд▓ рдХрд░рд╛. рд╣реЗ рддреБрдордЪреНтАНрдпрд╛ рдЦрд╛рддреНтАНрдпрд╛рдиреЗ рдЖрдкреЛрдЖрдк рд╕рд┐рдВрдХ рд╣реЛрддреЗ рдЖрдгрд┐ рддреБрдореНтАНрд╣реА рдЬреЗрдереЗ рдХреБрдареЗ рдЕрд╕рд╛рд▓ рддреЗрдереВрди рддреБрдореНтАНрд╣рд╛рд▓рд╛ рдСрдирд▓рд╛рдЗрди рдХрд┐рдВрд╡рд╛ рдСрдлрд▓рд╛рдЗрди рд╡рд╛рдЪрдгреНтАНрдпрд╛рдЪреА рдЕрдиреБрдорддреА рджреЗрддреЗ.
рд▓реЕрдкрдЯреЙрдк рдЖрдгрд┐ рдХреЙрдВрдкреНрдпреБрдЯрд░
рддреБрдореНрд╣реА рддреБрдордЪреНрдпрд╛ рдХрд╛рдБрдкреНрдпреБрдЯрд░рдЪрд╛ рд╡реЗрдм рдмреНрд░рд╛рдЙрдЭрд░ рд╡рд╛рдкрд░реВрди Google Play рд╡рд░ рдЦрд░реЗрджреА рдХреЗрд▓реЗрд▓реА рдСрдбрд┐рдУрдмреБрдХ рдРрдХреВ рд╢рдХрддрд╛.
рдИрд╡рд╛рдЪрдХ рдЖрдгрд┐ рдЗрддрд░ рдбрд┐рд╡реНрд╣рд╛рдЗрд╕реЗрд╕
Kobo eReaders рд╕рд╛рд░рдЦреНрдпрд╛ рдИ-рдЗрдВрдХ рдбрд┐рд╡реНтАНрд╣рд╛рдЗрд╕рд╡рд░ рд╡рд╛рдЪрдгреНтАНрдпрд╛рд╕рд╛рдареА, рддреБрдореНрд╣реА рдПрдЦрд╛рджреА рдлрд╛рдЗрд▓ рдбрд╛рдЙрдирд▓реЛрдб рдХрд░реВрди рддреА рддреБрдордЪреНтАНрдпрд╛ рдбрд┐рд╡реНтАНрд╣рд╛рдЗрд╕рд╡рд░ рдЯреНрд░рд╛рдиреНрд╕рдлрд░ рдХрд░рдгреЗ рдЖрд╡рд╢реНрдпрдХ рдЖрд╣реЗ. рд╕рдкреЛрд░реНрдЯ рдЕрд╕рд▓реЗрд▓реНрдпрд╛ eReaders рд╡рд░ рдлрд╛рдЗрд▓ рдЯреНрд░рд╛рдиреНрд╕рдлрд░ рдХрд░рдгреНрдпрд╛рд╕рд╛рдареА, рдорджрдд рдХреЗрдВрджреНрд░ рдордзреАрд▓ рддрдкрд╢реАрд▓рд╡рд╛рд░ рд╕реВрдЪрдирд╛ рдлреЙрд▓реЛ рдХрд░рд╛.
