پولینومهای با مقادیر صحیح (بررسیها و مونوگرافیهای ریاضی)
Integer-Valued Polynomials (Mathematical Surveys & Monographs)
معرفی کتاب «پولینومهای با مقادیر صحیح (بررسیها و مونوگرافیهای ریاضی)» (با عنوان لاتین Integer-Valued Polynomials (Mathematical Surveys & Monographs)) نوشتهٔ Paul-Jean Cahen; Jean-Luc Chabert; American Mathematical Society، منتشرشده توسط نشر American Mathematical Society(RI) در سال 1996. این کتاب در 322 صفحه، فرمت djvu، زبان انگلیسی ارائه شده است.
Integer-valued polynomials on the ring of integers have been known for a long time and have been used in calculus. Polya and Ostrowski generalized this notion to rings of integers of number fields. More generally still, one may consider a domain $D$ and the polynomials (with coefficients in its quotient field) mapping $D$ into itself. They form a $D$-algebra—that is, a $D$-module with a ring structure. Appearing in a very natural fashion, this ring possesses quite a rich structure, and the very numerous questions it raises allow a thorough exploration of commutative algebra. Here is the first book devoted entirely to this topic. Features: Thorough reviews of many published works. Self-contained text with complete proofs. Numerous exercises. Integer-valued Polynomials On The Ring Of Integers Have Been Known For A Long Time And Have Been Used In Calculus. P @olya And Ostrowski Generalized This Notion To Rings Of Integers Of Number Fields. More Generally Still, One May Consider A Domain D And The Polynomials (with Coefficients In Its Quotient Field) Mapping D Into Itself. They Form A D -algebra -- That Is, A D -module With A Ring Structure. Appearing In A Very Natural Fashion, This Ring Possesses Quite A Righ Structure, And The Very Numerous Questions It Raises Allow A Throrough Exploration Of Commuative Algebra. Here Is The First Book Devoted Entirely To This Topic. Features: Bl Thorough Reviews Of Many Published Works Bl Self-contained Text With Complete Proofs Bl Numerous Exercises Integer-valued polynomials on the ring of integers have been known for a long time and have been used in calculus. Pólya and Ostrowski generalized this notion to rings of integers of number fields. More generally still, one may consider a domain $D$ and the polynomials (with coefficients in its quotient field) mapping $D$ into itself. They form a $D$-algebra—that is, a $D$-module with a ring structure. Appearing in a very natural fashion, this ring possesses quite a rich structure, and the very numerous questions it raises allow a thorough exploration of commutative algebra. Here is the first book devoted entirely to this topic. Features: Thorough reviews of many published works. Self-contained text with complete proofs. Numerous exercises. Integer-valued polynomials on the ring of integers have been known for a long time and have been used in calculus. Polya and Ostrowski generalized this notion to rings of integers of number fields. This book addresses this topic.
دانلود کتاب پولینومهای با مقادیر صحیح (بررسیها و مونوگرافیهای ریاضی)