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- Affine q-Krawtchouk
- Al-Salam-Carlitz I
- Al-Salam-Carlitz II
- Al-Salam-Chihara
- Askey-Wilson
- Asymptotic Approximations
- Basic hypergeometric functions
- Bessel
- Big q-Jacobi
- Big q-Jacobi: Special case
- Big q-Laguerre
- Charlier
- Continuous Hahn
- Continuous big q-Hermite
- Continuous dual Hahn
- Continuous dual q-Hahn
- Continuous q-Hahn
- Continuous q-Hermite
- Continuous q-Jacobi
- Continuous q-Jacobi: Special cases
- Continuous q-Laguerre
- DLMF Results
- DRMF-LIST
- Definition:AffqKrawtchouk
- Definition:AlSalamCarlitzI
- Definition:AlSalamCarlitzII
- Definition:AlSalamChihara
- Definition:AlSalamIsmail
- Definition:AntiDer
- Definition:BesselPolyIIparam
- Definition:BesselPolyTheta
- Definition:CiglerqChebyT
- Definition:CiglerqChebyU
- Definition:GenHermite
- Definition:GottliebLaguerre
- Definition:Hahn
- Definition:Int
- Definition:JacksonqBesselII
- Definition:JacksonqBesselIII
- Definition:NeumannFactor
- Definition:Racah
- Definition:StieltjesConstants
- Definition:StieltjesWigert
- Definition:Wilson
- Definition:bigqJacobiIVparam
- Definition:bigqLaguerre
- Definition:bigqLegendre
- Definition:ctsHahn
- Definition:ctsbigqHermite
- Definition:ctsdualHahn
- Definition:ctsdualqHahn
- Definition:ctsqHahn
- Definition:ctsqHermite
- Definition:ctsqJacobi
- Definition:ctsqLaguerre
- Definition:ctsqLegendre
- Definition:discrqHermiteI
- Definition:discrqHermiteII
- Definition:dualHahn
- Definition:dualqHahn
- Definition:dualqKrawtchouk
- Definition:f
- Definition:littleqLaguerre
- Definition:littleqLegendre
- Definition:lrselection
- Definition:monicAffqKrawtchouk
- Definition:monicAlSalamCarlitzI
- Definition:monicAlSalamCarlitzII
- Definition:monicAlSalamChihara
- Definition:monicAskeyWilson
- Definition:monicBesselPoly
- Definition:monicCharlier
- Definition:monicChebyT
- Definition:monicChebyU
- Definition:monicHahn
- Definition:monicHermite
- Definition:monicJacobi
- Definition:monicKrawtchouk
- Definition:monicLaguerre
- Definition:monicLegendrePoly
- Definition:monicMeixner
- Definition:monicMeixnerPollaczek
- Definition:monicRacah
- Definition:monicStieltjesWigert
- Definition:monicUltra
- Definition:monicWilson
- Definition:monicbigqJacobi
- Definition:monicbigqLaguerre
- Definition:monicbigqLegendre
- Definition:monicctsHahn
- Definition:monicctsbigqHermite
- Definition:monicctsdualHahn
- Definition:monicctsdualqHahn
- Definition:monicctsqHahn
- Definition:monicctsqHermite
- Definition:monicctsqJacobi
- Definition:monicctsqLaguerre
- Definition:monicctsqLegendre
- Definition:monicctsqUltra
- Definition:monicdiscrqHermiteI
- Definition:monicdiscrqHermiteII
- Definition:monicdualHahn
- Definition:monicdualqHahn
- Definition:monicdualqKrawtchouk
- Definition:moniclittleqJacobi
- Definition:moniclittleqLaguerre
- Definition:moniclittleqLegendre
- Definition:monicpseudoJacobi
- Definition:monicqBesselPoly
- Definition:monicqCharlier
- Definition:monicqHahn
- Definition:monicqKrawtchouk
- Definition:monicqLaguerre
- Definition:monicqMeixner
- Definition:monicqMeixnerPollaczek
- Definition:monicqRacah
- Definition:monicqinvAlSalamChihara
- Definition:monicqtmqKrawtchouk
- Definition:normJacobiR
- Definition:normWilsonWtilde
- Definition:normctsHahnptilde
- Definition:normctsdualHahnStilde
- Definition:normctsdualqHahnptilde
- Definition:normctsqHahnptilde
- Definition:poly
- Definition:qBesselPoly
- Definition:qCharlier
- Definition:qCosKLS
- Definition:qDigamma
- Definition:qExpKLS
- Definition:qHahn
- Definition:qHyperrWs
- Definition:qKrawtchouk
- Definition:qLaguerre
- Definition:qMeixner
- Definition:qMeixnerPollaczek
- Definition:qRacah
- Definition:qSinKLS
- Definition:qcosKLS
- Definition:qexpKLS
- Definition:qinvAlSalamChihara
- Definition:qsinKLS
- Definition:qtmqKrawtchouk
- Definition and Expansions
- Dirichlet L-functions
- Discrete q-Hermite I
- Discrete q-Hermite II
- Dual Hahn
- Dual q-Hahn
- Dual q-Krawtchouk
- Formula:A
- Formula:B
- Formula:C
- Formula:DLMF:25.10:E1
- Formula:DLMF:25.10:E3
- Formula:DLMF:25.11:E1
- Formula:DLMF:25.11:E10
- Formula:DLMF:25.11:E11
- Formula:DLMF:25.11:E12
- Formula:DLMF:25.11:E13
- Formula:DLMF:25.11:E14
- Formula:DLMF:25.11:E15
- Formula:DLMF:25.11:E16
- Formula:DLMF:25.11:E17
- Formula:DLMF:25.11:E18
- Formula:DLMF:25.11:E19
- Formula:DLMF:25.11:E2
- Formula:DLMF:25.11:E20
- Formula:DLMF:25.11:E21
- Formula:DLMF:25.11:E22
- Formula:DLMF:25.11:E23
- Formula:DLMF:25.11:E24
- Formula:DLMF:25.11:E25
- Formula:DLMF:25.11:E26
- Formula:DLMF:25.11:E27
- Formula:DLMF:25.11:E28
- Formula:DLMF:25.11:E29
- Formula:DLMF:25.11:E3
- Formula:DLMF:25.11:E30
- Formula:DLMF:25.11:E31
- Formula:DLMF:25.11:E32
- Formula:DLMF:25.11:E34
- Formula:DLMF:25.11:E35
- Formula:DLMF:25.11:E36
- Formula:DLMF:25.11:E37
- Formula:DLMF:25.11:E38
- Formula:DLMF:25.11:E39
- Formula:DLMF:25.11:E4
- Formula:DLMF:25.11:E41
- Formula:DLMF:25.11:E42
- Formula:DLMF:25.11:E43
- Formula:DLMF:25.11:E44
- Formula:DLMF:25.11:E45
- Formula:DLMF:25.11:E5
- Formula:DLMF:25.11:E6
- Formula:DLMF:25.11:E7
- Formula:DLMF:25.11:E8
- Formula:DLMF:25.11:E9
- Formula:DLMF:25.12:E1
- Formula:DLMF:25.12:E10
- Formula:DLMF:25.12:E11
- Formula:DLMF:25.12:E12
- Formula:DLMF:25.12:E13
- Formula:DLMF:25.12:E14
- Formula:DLMF:25.12:E15
- Formula:DLMF:25.12:E16:SE1
- Formula:DLMF:25.12:E16:SE2
- Formula:DLMF:25.12:E2
- Formula:DLMF:25.12:E3
- Formula:DLMF:25.12:E4
- Formula:DLMF:25.12:E5
- Formula:DLMF:25.12:E6
- Formula:DLMF:25.12:E7
- Formula:DLMF:25.12:E8
- Formula:DLMF:25.12:E9
- Formula:DLMF:25.13:E1
- Formula:DLMF:25.13:E2
- Formula:DLMF:25.13:E3
- Formula:DLMF:25.14:E1
- Formula:DLMF:25.14:E2
- Formula:DLMF:25.14:E3
- Formula:DLMF:25.14:E4
- Formula:DLMF:25.14:E5
- Formula:DLMF:25.14:E6
- Formula:DLMF:25.15:E1
- Formula:DLMF:25.15:E10
- Formula:DLMF:25.15:E2
- Formula:DLMF:25.15:E3
- Formula:DLMF:25.15:E4
- Formula:DLMF:25.15:E5
- Formula:DLMF:25.15:E7
- Formula:DLMF:25.15:E8
- Formula:DLMF:25.15:E9
- Formula:DLMF:25.16:E1
- Formula:DLMF:25.16:E10
- Formula:DLMF:25.16:E11
- Formula:DLMF:25.16:E12
- Formula:DLMF:25.16:E13
- Formula:DLMF:25.16:E14
- Formula:DLMF:25.16:E15
- Formula:DLMF:25.16:E2
- Formula:DLMF:25.16:E3
- Formula:DLMF:25.16:E4
- Formula:DLMF:25.16:E5
- Formula:DLMF:25.16:E6
- Formula:DLMF:25.16:E7
- Formula:DLMF:25.16:E8:SE1
- Formula:DLMF:25.16:E8:SE2
- Formula:DLMF:25.16:E9
- Formula:DLMF:25.2:E1
- Formula:DLMF:25.2:E10
- Formula:DLMF:25.2:E11
- Formula:DLMF:25.2:E12
- Formula:DLMF:25.2:E2
- Formula:DLMF:25.2:E3
- Formula:DLMF:25.2:E4
- Formula:DLMF:25.2:E6
- Formula:DLMF:25.2:E7
- Formula:DLMF:25.2:E8
- Formula:DLMF:25.2:E9
- Formula:DLMF:25.4:E1
- Formula:DLMF:25.4:E2
- Formula:DLMF:25.4:E3
- Formula:DLMF:25.4:E4
- Formula:DLMF:25.4:E5
- Formula:DLMF:25.5:E1
- Formula:DLMF:25.5:E10
- Formula:DLMF:25.5:E11
- Formula:DLMF:25.5:E12
- Formula:DLMF:25.5:E13
- Formula:DLMF:25.5:E15
- Formula:DLMF:25.5:E16
- Formula:DLMF:25.5:E17
- Formula:DLMF:25.5:E18
- Formula:DLMF:25.5:E19
- Formula:DLMF:25.5:E2
- Formula:DLMF:25.5:E20
- Formula:DLMF:25.5:E21
- Formula:DLMF:25.5:E3
- Formula:DLMF:25.5:E4
- Formula:DLMF:25.5:E5
- Formula:DLMF:25.5:E6
- Formula:DLMF:25.5:E7
- Formula:DLMF:25.5:E8
- Formula:DLMF:25.5:E9
- Formula:DLMF:25.6:E10
- Formula:DLMF:25.6:E11
- Formula:DLMF:25.6:E12
- Formula:DLMF:25.6:E13
- Formula:DLMF:25.6:E14
- Formula:DLMF:25.6:E15
- Formula:DLMF:25.6:E16
- Formula:DLMF:25.6:E17
- Formula:DLMF:25.6:E18
- Formula:DLMF:25.6:E19
- Formula:DLMF:25.6:E1:SE1
- Formula:DLMF:25.6:E1:SE2
- Formula:DLMF:25.6:E1:SE3
- Formula:DLMF:25.6:E1:SE4
- Formula:DLMF:25.6:E2
- Formula:DLMF:25.6:E20
- Formula:DLMF:25.6:E3
- Formula:DLMF:25.6:E4
- Formula:DLMF:25.6:E5
- Formula:DLMF:25.6:E6
- Formula:DLMF:25.6:E7
- Formula:DLMF:25.6:E8
- Formula:DLMF:25.6:E9
- Formula:DLMF:25.8:E1
- Formula:DLMF:25.8:E10
- Formula:DLMF:25.8:E2
- Formula:DLMF:25.8:E3
- Formula:DLMF:25.8:E4
- Formula:DLMF:25.8:E5
- Formula:DLMF:25.8:E6
- Formula:DLMF:25.8:E7
- Formula:DLMF:25.8:E8
- Formula:DLMF:25.8:E9
- Formula:DLMF:25.9:E1