hasLocalTruncationErrorOrder
P105618
predicate
Indicates the order or degree to which a local truncation error term appears or dominates in a numerical or analytical approximation.
All labels observed (3)
| Label | Occurrences |
|---|---|
| approximationOrder | 7 |
| orderOfAccuracy | 2 |
| hasLocalTruncationErrorOrder canonical | 1 |
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: hasLocalTruncationErrorOrder
Generated description
Indicates the order or degree to which a local truncation error term appears or dominates in a numerical or analytical approximation.
Sample triples (10)
| Subject | Object |
|---|---|
| classical fourth-order Runge–Kutta method | 5 ⓘ |
| Born series | can be truncated at low order for weak potentials via predicate surface "approximationOrder" ⓘ |
| Born expansion of Green’s function | first Born approximation via predicate surface "approximationOrder" ⓘ |
| Born expansion of Green’s function | second Born approximation via predicate surface "approximationOrder" ⓘ |
| Born expansion of Green’s function | higher-order Born approximations via predicate surface "approximationOrder" ⓘ |
| theta-method | first order for theta ≠ 1/2 via predicate surface "orderOfAccuracy" ⓘ |
| theta-method | second order for theta = 1/2 via predicate surface "orderOfAccuracy" ⓘ |
|
Zeldovich approximation in large-scale structure formation
surface form:
Zeldovich approximation
|
first-order Lagrangian perturbation theory via predicate surface "approximationOrder" ⓘ |
| Wolfenstein parameterization | often truncated at O(λ³) via predicate surface "approximationOrder" ⓘ |
| Edgeworth series | can be extended to arbitrary finite order in 1/sqrt(n) via predicate surface "approximationOrder" ⓘ |