Multiplicative Number Theory I. Classical Theory (Hugh L. Montgomery, Robert C. Vaughan)
E638640
Multiplicative Number Theory I. Classical Theory (by Hugh L. Montgomery and Robert C. Vaughan) is a foundational graduate-level textbook that systematically develops the classical theory of multiplicative number theory, including Dirichlet characters, L-functions, and the distribution of prime numbers.
All labels observed (2)
How this entity was disambiguated
This entity first appeared as the object of triple T7030756 — resolving that mention is where its identity was fixed. The disambiguator weighed these candidate entities and picked the highlighted one (or “None”, minting a new entity). This is how homonymy is resolved: the same surface form can point to different entities.
Target entity: Multiplicative Number Theory I. Classical Theory (Hugh L. Montgomery, Robert C. Vaughan) Context triple: [Multiplicative Number Theory, hasTextbook, Multiplicative Number Theory I. Classical Theory (Hugh L. Montgomery, Robert C. Vaughan)]
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A.
Multiplicative Number Theory
Multiplicative Number Theory is a branch of analytic number theory that studies arithmetic functions and prime number distributions through their multiplicative properties and associated Dirichlet series.
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B.
An Introduction to the Theory of Numbers
An Introduction to the Theory of Numbers is a classic textbook in number theory, co-authored by G. H. Hardy, that systematically develops fundamental concepts such as divisibility, prime numbers, Diophantine equations, and quadratic forms.
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C.
Selberg–Delange method results
Selberg–Delange method results are asymptotic formulas in analytic number theory that precisely describe the average order and distribution of multiplicative arithmetic functions using complex-analytic techniques.
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D.
A. Ivić, The Riemann Zeta-Function
"A. Ivić, The Riemann Zeta-Function" is a comprehensive monograph on the analytic theory of the Riemann zeta function, widely regarded as a standard modern reference in analytic number theory.
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E.
E. C. Titchmarsh, The Theory of the Riemann Zeta-Function
"E. C. Titchmarsh, The Theory of the Riemann Zeta-Function" is a classic monograph in analytic number theory that provides a comprehensive and authoritative treatment of the Riemann zeta function and related topics.
- F. None of above. chosen
- G. Unsure - the case is ambiguous/there is not enough information to decide.
Target entity: Multiplicative Number Theory I. Classical Theory (Hugh L. Montgomery, Robert C. Vaughan) Target entity description: Multiplicative Number Theory I. Classical Theory (by Hugh L. Montgomery and Robert C. Vaughan) is a foundational graduate-level textbook that systematically develops the classical theory of multiplicative number theory, including Dirichlet characters, L-functions, and the distribution of prime numbers.
-
A.
Multiplicative Number Theory
Multiplicative Number Theory is a branch of analytic number theory that studies arithmetic functions and prime number distributions through their multiplicative properties and associated Dirichlet series.
-
B.
An Introduction to the Theory of Numbers
An Introduction to the Theory of Numbers is a classic textbook in number theory, co-authored by G. H. Hardy, that systematically develops fundamental concepts such as divisibility, prime numbers, Diophantine equations, and quadratic forms.
-
C.
Selberg–Delange method results
Selberg–Delange method results are asymptotic formulas in analytic number theory that precisely describe the average order and distribution of multiplicative arithmetic functions using complex-analytic techniques.
-
D.
A. Ivić, The Riemann Zeta-Function
"A. Ivić, The Riemann Zeta-Function" is a comprehensive monograph on the analytic theory of the Riemann zeta function, widely regarded as a standard modern reference in analytic number theory.
-
E.
E. C. Titchmarsh, The Theory of the Riemann Zeta-Function
"E. C. Titchmarsh, The Theory of the Riemann Zeta-Function" is a classic monograph in analytic number theory that provides a comprehensive and authoritative treatment of the Riemann zeta function and related topics.
- F. None of above. chosen
Statements (40)
| Predicate | Object |
|---|---|
| instanceOf |
book
ⓘ
textbook ⓘ |
| academicLevel | graduate ⓘ |
| author |
Hugh L. Montgomery
NERFINISHED
ⓘ
Robert C. Vaughan NERFINISHED ⓘ |
| contribution | systematic exposition of classical multiplicative number theory ⓘ |
| field |
multiplicative number theory
ⓘ
number theory ⓘ |
| focus | classical methods ⓘ |
| genre | mathematics textbook ⓘ |
| hasPart |
development of classical analytic techniques in number theory
ⓘ
treatment of Dirichlet L-functions ⓘ treatment of Dirichlet characters ⓘ treatment of the distribution of primes in arithmetic progressions ⓘ |
| intendedAudience |
graduate students in mathematics
ⓘ
researchers in analytic number theory ⓘ |
| language | English ⓘ |
| subject |
analytic number theory
ⓘ
prime numbers ⓘ |
| topic |
Dirichlet L-functions
NERFINISHED
ⓘ
Dirichlet characters ⓘ Dirichlet series NERFINISHED ⓘ Dirichlet’s theorem on primes in arithmetic progressions NERFINISHED ⓘ Euler products NERFINISHED ⓘ L-functions NERFINISHED ⓘ Mertens-type estimates ⓘ Tauberian theorems in number theory ⓘ analytic properties of L-functions ⓘ characters and exponential sums ⓘ characters modulo q ⓘ distribution of prime numbers ⓘ mean values of multiplicative functions ⓘ multiplicative functions ⓘ orthogonality relations of characters ⓘ partial summation and summatory functions ⓘ prime number theorem ⓘ zero-density estimates (classical theory) ⓘ zero-free regions for L-functions ⓘ |
| usedIn |
graduate courses on analytic number theory
ⓘ
graduate courses on multiplicative number theory ⓘ |
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Subject: Multiplicative Number Theory I. Classical Theory (Hugh L. Montgomery, Robert C. Vaughan) Description of subject: Multiplicative Number Theory I. Classical Theory (by Hugh L. Montgomery and Robert C. Vaughan) is a foundational graduate-level textbook that systematically develops the classical theory of multiplicative number theory, including Dirichlet characters, L-functions, and the distribution of prime numbers.
Referenced by (2)
Full triples — surface form annotated when it differs from this entity's canonical label.