hasLieAlgebra

P28830
predicate

Indicates that one mathematical structure is associated with, or gives rise to, a specific Lie algebra capturing its infinitesimal or tangent-level structure.

All labels observed (11)

Label Occurrences
hasLieAlgebra canonical 19
LieAlgebra 5
LieAlgebraDescription 3

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: hasLieAlgebra
Generated description
Indicates that one mathematical structure is associated with, or gives rise to, a specific Lie algebra capturing its infinitesimal or tangent-level structure.

Sample triples (36)

Subject Object
Poincaré group Poincaré group self-linksurface differs
surface form: Poincaré algebra
Lorentz group so(1,3)
E(n) e(n)
Lie ring true via predicate surface "canInduceLieAlgebraOverField"
Lie subgroup Lie subalgebra of the ambient Lie algebra via predicate surface "hasTangentSpaceAtIdentity"
AdS isometry group SO(2,d) so(2,d)
SU(3) su(3)
rotation group SO(3)
surface form: SO(3)
so(3) via predicate surface "LieAlgebra"
rotation group SO(3)
surface form: SO(3)
ℝ³ with cross product via predicate surface "LieAlgebraIsomorphicTo"
SL(2,C) sl(2,C)
rotation group SU(2)
surface form: SU(2)
su(2)
orthogonal group O(n) skew-symmetric n×n real matrices
affine group of R^n affine Lie algebra of R^n
affine group of R^n R^n ⋊ gl(n,R) via predicate surface "hasLieAlgebraStructure"
special orthogonal group SO(n)
surface form: SO(n)
so(n) via predicate surface "LieAlgebra"
special orthogonal group SO(n)
surface form: SO(n)
skew-symmetric n×n real matrices via predicate surface "LieAlgebraDescription"
U(1) iR
Poisson bracket space of smooth functions on a Poisson manifold via predicate surface "definesLieAlgebraOn"
orthogonal group O(n+1,2) 𝔰𝔬(n+1,2)
special unitary group SU(n)
surface form: SU(n)
su(n) via predicate surface "LieAlgebra"
special unitary group SU(n)
surface form: SU(n)
traceless skew-Hermitian n×n complex matrices via predicate surface "LieAlgebraDescription"
general linear group GL(n,R)
surface form: GL(n,ℝ)
gl(n,ℝ) NERFINISHED
general linear group GL(n,R)
surface form: GL(n,ℝ)
all n×n real matrices via predicate surface "LieAlgebraDescription"
special linear group SL(n,R)
surface form: SL(n,ℝ)
sl(n,ℝ)
SO(2,d-1) so(2,d-1)
Spin(2,d) \mathfrak{so}(2,d)
general linear group GL(n,C)
surface form: GL(n,ℂ)
𝔤𝔩(n,ℂ) via predicate surface "LieAlgebra"
general linear group GL(n,C)
surface form: GL(n,ℂ)
all n×n complex matrices with usual commutator bracket via predicate surface "LieAlgebraDefinedAs"
special linear group SL(n,C)
surface form: SL(n,ℂ)
sl(n,ℂ)
special linear group SL(n,C)
surface form: SL(n,ℂ)
trace zero matrices via predicate surface "hasLieAlgebraCondition"
PSL(2,ℝ) sl(2,ℝ) NERFINISHED
sl(2,C) SL(2,C) via predicate surface "associatedLieGroup" NERFINISHED
SL(2,R) sl(2,R) via predicate surface "LieAlgebra"
SL(2,R) 2×2 real matrices with trace 0 via predicate surface "LieAlgebraDefinedAs"
metaplectic group symplectic Lie algebra
PSL(2,\mathbb{C})
surface form: PSL(2,ℂ)
sl(2,ℂ)