Ramanujan tau function
E355432
The Ramanujan tau function is a multiplicative arithmetic function arising from the Fourier coefficients of a modular discriminant form, central to the study of modular forms and number theory.
All labels observed (1)
| Label | Occurrences |
|---|---|
| Ramanujan tau function canonical | 3 |
How this entity was disambiguated
This entity first appeared as the object of triple T3410515 — 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: Ramanujan tau function Context triple: [Srinivasa Ramanujan, notableWork, Ramanujan tau function]
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A.
Riemann–Siegel formula
The Riemann–Siegel formula is an asymptotic expression that efficiently approximates the Riemann zeta function on the critical line, playing a key role in the numerical study of its zeros.
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B.
Riemann–Siegel theta function
The Riemann–Siegel theta function is a special function that appears in the study of the Riemann zeta function, used to express its values on the critical line in a form suitable for high-precision numerical computation.
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C.
Riemann zeta function
The Riemann zeta function is a complex-valued function central to analytic number theory, whose properties—especially the distribution of its zeros—are deeply connected to the distribution of prime numbers.
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D.
Hardy–Ramanujan asymptotic formula
The Hardy–Ramanujan asymptotic formula is a landmark result in number theory that gives an approximate expression for the partition function p(n), describing how the number of integer partitions of n grows rapidly with n.
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E.
Chebyshev functions
Chebyshev functions are arithmetic functions in number theory that encode information about the distribution of prime numbers and play a key role in analytic approaches to the prime number theorem.
- F. None of above. chosen
- G. Unsure - the case is ambiguous/there is not enough information to decide.
Target entity: Ramanujan tau function Target entity description: The Ramanujan tau function is a multiplicative arithmetic function arising from the Fourier coefficients of a modular discriminant form, central to the study of modular forms and number theory.
-
A.
Riemann–Siegel formula
The Riemann–Siegel formula is an asymptotic expression that efficiently approximates the Riemann zeta function on the critical line, playing a key role in the numerical study of its zeros.
-
B.
Riemann–Siegel theta function
The Riemann–Siegel theta function is a special function that appears in the study of the Riemann zeta function, used to express its values on the critical line in a form suitable for high-precision numerical computation.
-
C.
Riemann zeta function
The Riemann zeta function is a complex-valued function central to analytic number theory, whose properties—especially the distribution of its zeros—are deeply connected to the distribution of prime numbers.
-
D.
Hardy–Ramanujan asymptotic formula
The Hardy–Ramanujan asymptotic formula is a landmark result in number theory that gives an approximate expression for the partition function p(n), describing how the number of integer partitions of n grows rapidly with n.
-
E.
Chebyshev functions
Chebyshev functions are arithmetic functions in number theory that encode information about the distribution of prime numbers and play a key role in analytic approaches to the prime number theorem.
- F. None of above. chosen
Statements (50)
| Predicate | Object |
|---|---|
| instanceOf |
Fourier coefficient function
ⓘ
arithmetic function ⓘ multiplicative function ⓘ number-theoretic function ⓘ |
| appearsIn | Ramanujan’s paper on highly composite numbers and modular forms ⓘ |
| associatedWith | unique normalized cusp form of weight 12 for SL(2,ℤ) ⓘ |
| codomain | integers ⓘ |
| congruenceProperty |
τ(n) ≡ n^{11} + 1217 n^3 (mod 2^11) for certain n
ⓘ
τ(n) ≡ n^{11} + 5 n^7 (mod 3^6) for certain n ⓘ τ(n) ≡ σ_{11}(n) (mod 691) ⓘ |
| definedAs | Fourier coefficients of the modular discriminant Δ(z) ⓘ |
| domain | positive integers ⓘ |
| eigenformProperty | Hecke eigenvalues equal τ(n) ⓘ |
| generatingFunction | Δ(z) = q ∏_{n≥1} (1 - q^n)^{24} = ∑_{n≥1} τ(n) q^n with q = e^{2πiz} ⓘ |
| growthBound | |τ(p)| ≤ 2 p^{11/2} for prime p ⓘ |
| introducedBy | Srinivasa Ramanujan ⓘ |
| LFunction | L(Δ,s) = ∑_{n≥1} τ(n) n^{-s} ⓘ |
| LFunctionType | degree 2 L-function ⓘ |
| multiplicativeProperty | τ(mn) = τ(m)τ(n) for gcd(m,n)=1 ⓘ |
| namedAfter | Srinivasa Ramanujan ⓘ |
| openProblem |
infinitely many n with τ(n) = 0 is unknown
ⓘ
sign changes of τ(n) are not fully understood ⓘ |
| recurrencePrimePowers | τ(p^{k+1}) = τ(p)τ(p^k) - p^{11}τ(p^{k-1}) for prime p and k ≥ 1 ⓘ |
| relatedTo |
Deligne’s proof of the Weil conjectures
ⓘ
Eisenstein series of weight 12 ⓘ Galois representations ⓘ Ramanujan–Petersson conjecture ⓘ
surface form:
Ramanujan conjectures
cusp forms ⓘ discriminant of the elliptic modular function ⓘ modular discriminant Δ(z) ⓘ modular forms ⓘ ℓ-adic Galois representation attached to Δ ⓘ |
| satisfies |
Hecke multiplicativity relations
ⓘ
Ramanujan–Petersson conjecture ⓘ
surface form:
Ramanujan–Petersson conjecture (proved by Deligne)
functional equation of weight 12 cusp form L-function ⓘ |
| studiedIn |
algebraic number theory
ⓘ
analytic number theory ⓘ theory of modular forms ⓘ |
| symbol | τ(n) ⓘ |
| valueAt |
τ(1) = 1
ⓘ
τ(10) = -115920 ⓘ τ(2) = -24 ⓘ τ(3) = 252 ⓘ τ(4) = -1472 ⓘ τ(5) = 4830 ⓘ τ(7) = -16744 ⓘ τ(8) = 84480 ⓘ τ(9) = -113643 ⓘ |
| weight | 12 ⓘ |
| yearIntroduced | 1916 ⓘ |
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Subject: Ramanujan tau function Description of subject: The Ramanujan tau function is a multiplicative arithmetic function arising from the Fourier coefficients of a modular discriminant form, central to the study of modular forms and number theory.
Referenced by (3)
Full triples — surface form annotated when it differs from this entity's canonical label.