specialValue
P37888
predicate
Indicates that an entity possesses a distinguished or exceptional value compared to typical or default values in the given context.
All labels observed (2)
| Label | Occurrences |
|---|---|
| specialValue canonical | 18 |
| hasSpecialValue | 4 |
Description generation (PDg)
The one-sentence description above was generated by prompting gpt-5.1 with the predicate name and this instruction.
Instruction
Given a predicate that represents a relationship or action between entities, generate a one-sentence description explaining its meaning. # Instructions Focus on describing the relationship, not the entities themselves. # Response Format Begin the description with \' Indicates...\'
Input
Predicate: specialValue
Generated description
Indicates that an entity possesses a distinguished or exceptional value compared to typical or default values in the given context.
Sample triples (22)
| Subject | Object |
|---|---|
| Riemann zeta function | ζ(2) = π^2/6 ⓘ |
| Riemann zeta function | ζ(4) = π^4/90 ⓘ |
| Riemann zeta function | ζ(0) = -1/2 ⓘ |
| Riemann zeta function | ζ(-1) = -1/12 ⓘ |
| Riemann zeta function | ζ(1/2) is irrational (conjectured, not proved) ⓘ |
| Euler’s totient function φ(n) | φ(2) = 1 is the only odd value for n > 1 ⓘ |
| Tukey's lambda distribution | lambda = 0 corresponds approximately to logistic distribution via predicate surface "hasSpecialValue" ⓘ |
| Tukey's lambda distribution | lambda = 0.14 corresponds approximately to normal distribution via predicate surface "hasSpecialValue" ⓘ |
| Tukey's lambda distribution | lambda = 0.5 corresponds approximately to uniform distribution via predicate surface "hasSpecialValue" ⓘ |
| Tukey's lambda distribution | lambda = -1 corresponds approximately to Cauchy distribution via predicate surface "hasSpecialValue" ⓘ |
| Bernoulli polynomials | B_n(0) = B_n (Bernoulli number) ⓘ |
| Bernoulli polynomials | B_n(1) = B_n for n ≠ 1 ⓘ |
| Bernoulli polynomials | B_1(0) = -1/2 ⓘ |
| Bernoulli polynomials | B_1(1) = 1/2 ⓘ |
| Gauss hypergeometric function | {}_2F_1(a,b;c;0)=1 ⓘ |
| Gauss hypergeometric function | {}_2F_1(a,b;a;z)=(1-z)^{-b} ⓘ |
| Gauss hypergeometric function | {}_2F_1(a,b;b;z)=(1-z)^{-a} ⓘ |
| Beta function | B(1,1)=1 ⓘ |
| Beta function | B(x,1)=1/x ⓘ |
| Beta function | B(1,y)=1/y ⓘ |
| Beta function | B(1/2,1/2)=π ⓘ |
| Barnes G-function | G(n+1)=∏_{k=1}^{n-1}k! for positive integers n ⓘ |