Kauffman polynomial

GPTKB entity

Statements (57)
Predicate Object
gptkbp:instance_of gptkb:Mathematician
gptkbp:can_be_computed_from link diagrams
gptkbp:has_applications_in gptkb:statistical_mechanics
gptkbp:has_function variables A and B
https://www.w3.org/2000/01/rdf-schema#label Kauffman polynomial
gptkbp:is_a gptkb:Mathematics
gptkb:language
gptkb:Marxism
invariant under Reidemeister moves
link invariant
topological invariant
knot invariant
polynomial invariant
link polynomial
complex polynomial
knot polynomial
link polynomial invariant
gptkbp:is_analyzed_in topological properties
knot equivalence
gptkbp:is_applied_in gptkb:computer_science
gptkbp:is_connected_to graph theory
categorical topology
gptkbp:is_considered mathematical physics
gptkbp:is_defined_by gptkb:Kauffman_bracket
knot theory
a recursive formula
a specific formula
a polynomial expression
gptkbp:is_evaluated_by A=1, B=1
specific values of A and B
gptkbp:is_explored_in mathematical relationships
gptkbp:is_expressed_in terms of crossings
a sum over all crossings
a series of terms
gptkbp:is_involved_in quantum topology
gptkbp:is_part_of mathematical research
gptkbp:is_related_to gptkb:quantum_field_theory
homology theory
braids
Jones polynomial
knot diagrams
knot theory research
gptkbp:is_standardized_by Alexander polynomial
gptkbp:is_studied_for knot invariants
gptkbp:is_studied_in algebraic topology
gptkbp:is_symmetric_in A and B
gptkbp:is_used_in gptkb:topology
gptkb:quantum_computing
gptkb:Physics
mathematical modeling
mathematical proofs
knot classification
the study of links
gptkbp:named_after gptkb:Louis_Kauffman
gptkbp:represents virtual knots
gptkbp:bfsParent gptkb:David_M._K._Kauffman
gptkbp:bfsLayer 5