%D9%84%D8%A7%D9%85%D8%AA%D8%BA%D9%8A%D8%B1InvariantInvariant_(matematika)InvariantInvariante_(Mathematik)Invariant_(mathematics)Invarianto_(matematiko)InvarianteInvariant%D9%86%D8%A7%D9%88%D8%B1%D8%AF%D8%A7InvarianssiInvariant%D7%A9%D7%9E%D7%95%D7%A8%D7%94_(%D7%9E%D7%AA%D7%9E%D7%98%D7%99%D7%A7%D7%94)%D4%BB%D5%B6%D5%BE%D5%A1%D6%80%D5%AB%D5%A1%D5%B6%D5%BF_(%D5%B4%D5%A1%D5%A9%D5%A5%D5%B4%D5%A1%D5%BF%D5%AB%D5%AF%D5%A1)Invarianza_(matematica)%E4%B8%8D%E5%A4%89%E9%87%8F%EB%B6%88%EB%B3%80%EB%9F%89%D0%98%D0%BD%D0%B2%D0%B0%D1%80%D0%B8%D0%B0%D0%BD%D1%82Invariantas_(matematika)Invariantu_metodeInvariant_(wiskunde)Niezmiennik_przekszta%C5%82ceniaInvariante%D0%98%D0%BD%D0%B2%D0%B0%D1%80%D0%B8%D0%B0%D0%BD%D1%82_(%D0%BC%D0%B0%D1%82%D0%B5%D0%BC%D0%B0%D1%82%D0%B8%D0%BA%D0%B0)Invariant_(matematika)Invarianta_(matematika)Invariant%D0%86%D0%BD%D0%B2%D0%B0%D1%80%D1%96%D0%B0%D0%BD%D1%82_(%D0%BC%D0%B0%D1%82%D0%B5%D0%BC%D0%B0%D1%82%D0%B8%D0%BA%D0%B0)InvariantlarQ188211
about
P1552
Čech cohomologyhomologyDe Rham cohomologyDolbeault cohomologyconstantirregularity of a surfaceGromov–Witten invariantcohomological invariantInvariant of a binary formj-multiplicityweak dimensiondeterminantGopakumar-Vafa invariantknot invariantGriffiths groupeigenvectors and eigenvalueslinking numberinvariantsystoleétale fundamental groupinvariant polynomialtraceexponent of a groupdepthBerezinianCarminati–McLenaghan invariantsBass numberbirational invariantChow ringcohomological dimensionCohomotopy groupComplex dimensionDeligne cohomologyDeviation of a local ringdifferential invariantDonaldson–Thomas theoryFitting idealHilbert polynomialHilbert–Samuel functionIitaka dimension
P279
eccentricitysignatureminimal polynomialKrull dimensiontorsion tensorTranscendence degreedegree of a polynomialLebesgue covering dimensionhomotopy group with coefficientsArason invariantintersection numberRost invariantcodimensionPicard groupminimal polynomialCanonical ringreal rankMinkowski–Bouligand dimensiondegree of a continuous mappingrank of a Lie algebraAlexander–Spanier cohomologymodule of an automorphismdimensionAndré–Quillen cohomologyArf invariantCastelnuovo–Mumford regularityCheeger constantDelta invariantdimension of an algebraic varietyeta invariantgenus of a quadratic formGonality of an algebraic curveHausdorff dimensionHasse invariant of a quadratic formwinding numberKodaira dimensiondimension of a schemeNevanlinna invariantNéron–Severi groupdivisor class group
P31
Q1095535-7157bd14-4d5c-3318-bf20-edceb7187dbcQ1144780-7cbd480b-4a45-21da-0631-840594286678Q1179446-70c7e117-420e-d19d-0883-b3f5539d0cf8Q1235317-0afca1c0-4038-0da6-424c-4869e55b8305Q1284190-8a3331d3-4f6d-eee8-ccbf-9f46f160acf3Q15122156-f29e1408-4e8f-0e51-f678-538ae5af94ffQ1547297-188338b0-43ff-f72f-6ac1-07c0d979af47Q17007180-ef869e48-4f4d-9d11-66a9-7dd42556b192Q17098178-ae041043-42ad-1884-8183-03fcd654cf18Q17098259-79f4953a-4bc6-58ac-eae9-ca0f747bf77bQ17104628-5a60e1f6-4d1d-d06d-28b8-42550d616096Q178546-13644b7f-4283-2ef1-00c2-8d9e0c2e9c30Q18579343-d8d3f0ff-4833-f45d-920f-1faccc170498Q1862434-b3b45fc0-4238-402a-497f-300e584baddfQ18815110-0ad66b88-4676-cf8f-65e5-9f80a5084551Q190524-1efb62a0-48c9-2b80-f7a9-e8c9a439b118Q2000614-cd200237-4361-e1ea-1d6b-24219446e404Q2370229-c6b453f6-48de-0bcb-eb9e-7d61f173ad4eQ2454208-1485f76b-4824-f5db-59c6-bbe83b5a0c41Q288764-81f5da2a-45dc-51ad-8024-fdf0e060ef1cQ2920801-aabca4fa-417c-93a9-5764-e35588ff3435Q321102-8d1ad954-427e-8afc-541f-a90e587acd28Q32998717-8af8c7c7-4864-f6c5-aff6-40389aff976cQ3406905-f079fdd7-4ab3-1245-3a01-e2751084a1aaQ3638518-a91e9f51-4555-695b-834f-5c21c53944dcQ4200520-590b70ee-4b2c-40db-f148-6ec745e33804Q4867985-77c02be3-45d0-1098-97c3-d13514117d55Q4915614-9056ea94-4b53-32ab-4bd8-b717d88a8c6eQ5105523-886fcb48-4e67-0a53-68f1-3f92c65f454fQ5141396-3ef640f5-47ae-aad4-6a90-312a669cb170Q5141401-5c9d823c-4458-fc67-9606-9620483aff7bQ5156577-2c2a8c0c-4814-0a0b-764d-e5d939c9099aQ5253964-79dcb1a6-4dad-d68b-6def-d1b88b4e6936Q5266996-c02c8a01-4346-8c85-90bd-a657a2ce3098Q5275353-69e0e13e-406e-4cb2-fff6-942014aedef2Q5295377-9d641739-4bbc-399d-e320-6799983a616cQ5455498-7ceefc9f-4427-891c-b7f4-3541d4f99149Q5761236-50180f23-4df1-3932-a786-d97734d77a82Q5761248-d9c7821c-4dde-97c7-6501-88d015efddccQ5995023-f3e87444-4d05-0f38-1360-9770b774b581
P279
Q104486-d198fb47-43f3-3ca8-4688-07c079a02c29Q1142562-2B441DA2-C9C0-4B45-95DA-C290F1FB46E5Q1163608-58cd61a1-4119-53e4-68d0-007406ae72e4Q1225713-8926f41f-4623-463e-5d1e-b3d7c296c5a0Q13229797-d9377bdc-4869-fc44-c047-df5559554bf7Q1387602-0ca6d770-43b9-69fe-99da-ea1923f67839Q1473607-8ce9c50e-40dc-45ac-8af0-70078c12be1eQ164262-f7be0785-4202-0381-50a8-d6123167917eQ16928261-094dcd11-49b4-5a63-69d7-e21566e3a2c1Q17004227-164f61dd-4811-69aa-0690-4ef219ca6684Q17101799-37f0348f-4f26-0fbc-41d6-f6b2076f26f0Q17102845-1971e529-4b49-c881-9f1e-ca0d8b5c411eQ1778247-c9e0c9d7-4ad7-1903-f26e-0bb516f5fd69Q2042963-675d9b0b-4eb0-2158-c7bd-99f074aadc81Q2242730-5f98a3a6-4cba-d020-d284-729ac152b860Q2251151-7332509b-4244-3067-003e-1bf501576513Q25351845-e320b6a5-4262-43a1-6b03-6934679a155aQ2555655-94c73d67-446d-7055-0fbc-71ea759fb951Q306564-292b1007-44ba-c90a-0aad-b8dda70f4808Q3930077-78f45973-4e1c-d299-87f9-0849eeb7d27aQ4143007-693cd09b-4218-31fa-dea7-638144af7892Q4299450-db07f6ef-473e-b7a4-46f7-3d043ddb752aQ4440864-21312e8d-4cd0-5ec5-bc9d-cc0e278ffeeeQ4760300-58ed057a-4cee-f90b-3da4-98fcb53db84cQ4789139-ac7802f0-430f-b621-3209-4006243caba8Q5049716-b44c4c5d-46f9-64e2-43cd-4bd77309f8bbQ5089259-c705e5e6-4cf6-c27a-df9c-d11b3da93119Q5254793-7fe9cc8f-422a-65e3-e311-53554afec411Q5277261-f12a934b-4fe4-9a09-36b4-0f921734690fQ5402374-9ecea163-4aec-d65a-d7e3-f5a290df1e22Q5533834-4dc03589-4039-0023-989f-62fe47052b8eQ5581336-7149e20e-4152-ebf5-6719-63a8de8d4a00Q565186-d5e01dc9-4f30-f7bd-e93b-34f72ef3a956Q5679984-4cab5f2c-4e95-9230-ba0c-014c7d00256bQ576728-9580e596-46ae-b79a-55f9-10d2b0341d35Q6425087-3743610f-4d70-aaaa-5cd7-af728dd0279eQ65090975-872a21a9-4283-66e3-2037-f617ee5a44b0Q7003744-af98175e-4eeb-8957-0f0d-2b5fa0f679a2Q7071450-ed962c5d-4bf5-f3de-b206-65aba274a1d0Q72096383-af42c514-45cf-349a-fe93-d728627a71cc
P31
description
cвойство, не меняющееся при преобразовании
@ru
matematikai objektumok olyan t ...... rmáció során változatlan marad
@hu
property of mathematical objec ...... mations applied to the objects
@en
propiedad de objetos matemáticos
@es
propraĵo de matematika objekto sendependa je elekto de priskribo
@eo
propriété d'un objet non modifiée par un procédé appliqué à l'objet
@fr
säännönmukainen tapahtumaketju
@fi
vlastnost matematických objektů, která se zachovává i při aplikaci transformací
@cs
wiskunde
@nl
zu einem Objekt assoziierte Gr ...... onen des Objektes nicht ändert
@de
name
Invarianssi
@fi
Invariant
@da
Invariant
@et
Invariant
@sk
Invarianta
@sl
Invariantas
@lt
Invariante
@de
Invariantlar
@uz
Invariantu metode
@lv
inbariante
@eu
type
label
Invarianssi
@fi
Invariant
@da
Invariant
@et
Invariant
@sk
Invarianta
@sl
Invariantas
@lt
Invariante
@de
Invariantlar
@uz
Invariantu metode
@lv
inbariante
@eu
altLabel
invariancia
@es
invarianza
@es
mathematical invariant
@en
nevarianto
@eo
nevariaĵo
@eo
инвариант (математика)
@ru
инвариант
@ru
математичний інваріант
@uk
непроменлива
@mk
інваріант (математика)
@uk
prefLabel
Invarianssi
@fi
Invariant
@da
Invariant
@et
Invariant
@sk
Invarianta
@sl
Invariantas
@lt
Invariante
@de
Invariantlar
@uz
Invariantu metode
@lv
inbariante
@eu
P279
P244
P2581
P646
P7033
P1417
topic/invariant
P244
sh85067665
P2581
P2812
P3219
invariant-mathematique
P6366
P646
P6477
P7033
scot/16647