On veut compter les arcs, les noeuds d'un graphe. On utilise également les classes.
from jyquickhelper import add_notebook_menu
add_notebook_menu()
Les données contiennent deux dictionnaires :
noeuds[i]
: contient la valeur associée au noeud i
arcs
: si le dictionnaire contient le tuple (i,j)
, alors les noeuds i
et j
sont reliés.# tutoriel_graphe
noeuds = {0: 'le', 1: 'silences', 2: 'quelques', 3: '\xe9crit', 4: 'non-dits.', 5: 'Et', 6: 'risque', 7: '\xe0', 8: "qu'elle,", 9: 'parfois', 10: 'aim\xe9', 11: 'lorsque', 12: 'que', 13: 'plus', 14: 'les', 15: 'Minelli,', 16: "n'oublierai", 17: 'je', 18: 'prises', 19: 'sa', 20: 'la', 21: 'jeune,', 22: "qu'elle,", 23: '\xe0', 24: 'ont', 25: "j'ai", 26: 'chemin', 27: '\xe9tranger', 28: 'lente', 29: 'de', 30: 'voir', 31: 'quand', 32: 'la', 33: 'recul,', 34: 'de', 35: 'trop', 36: 'ce', 37: 'Je', 38: 'Il', 39: "l'extr\xeame", 40: "J'ai", 41: 'silences,', 42: "qu'elle,", 43: 'le', 44: 'trace,', 45: 'avec', 46: 'seras', 47: 'dire,', 48: 'femme', 49: 'soit'}
arcs = {(3, 15): None, (46, 47): None, (42, 33): None, (35, 45): None, (1, 14): None, (22, 26): None, (26, 28): None, (43, 29): None, (40, 41): None, (29, 44): None, (17, 3): None, (32, 37): None, (24, 19): None, (46, 34): None, (11, 19): None, (34, 49): None, (22, 2): None, (37, 48): None, (14, 12): None, (3, 10): None, (5, 18): None, (12, 24): None, (34, 32): None, (45, 39): None, (37, 26): None, (33, 45): None, (34, 47): None, (36, 31): None, (29, 47): None, (13, 11): None, (12, 21): None, (2, 16): None, (5, 4): None, (33, 35): None, (28, 49): None, (25, 49): None, (21, 0): None, (3, 13): None, (18, 24): None, (12, 7): None, (13, 15): None, (11, 1): None, (16, 23): None, (37, 45): None, (27, 32): None, (32, 41): None, (8, 24): None, (10, 1): None, (2, 24): None, (24, 11): None, (2, 14): None, (47, 36): None, (48, 39): None, (30, 25): None, (30, 43): None, (15, 14): None, (26, 27): None, (6, 8): None, (20, 10): None, (19, 17): None, (5, 7): None, (44, 25): None, (27, 38): None, (2, 0): None, (3, 18): None, (3, 9): None, (25, 33): None, (42, 48): None, (2, 15): None, (26, 48): None, (26, 38): None, (7, 8): None, (8, 4): None}
points = [(0.84737386691659533, 0.95848816613228727), (0.28893525107454354, 0.66073249195336492), (0.60382037086559148, 0.13747945088383384), (0.21951613156582261, 0.040905525433785228), (0.21613062123493632, 0.096875623632852625), (0.99787588721497178, 0.79337171783327132), (0.18576957348508683, 0.78396225027633837), (0.23875443625588322, 0.35497638429086975), (0.8713637939628045, 0.22983756618811024), (0.28301724069085921, 0.99408996134013161), (0.39792684083973429, 0.77105362865540716), (0.75452041353842147, 0.330325155167562), (0.24824845436118537, 0.95998690078041737), (0.92318434139996397, 0.38115765401571988), (0.54660304309415886, 0.62093667623480242), (0.58899996464290505, 0.9017292023892568), (0.60541336358687847, 0.28929082523865812), (0.87925379747840293, 0.94834058131858756), (0.61449632813730748, 0.94264237081849722), (0.13119804743502139, 0.44158556198130949), (0.20660796942108339, 0.915599021810789), (0.3097131996826511, 0.81979953110332837), (0.89711055197298928, 0.7298496710091944), (0.22499060312661545, 0.072786594549671291), (0.012604758185058018, 0.36199484670070914), (0.92050750708863993, 0.91447248587261709), (0.26304069827339327, 0.026058147250910935), (0.59289937178711172, 0.86673111722782969), (0.70640070176443837, 0.64096733852134291), (0.049399266565914535, 0.54027723332288746), (0.26450585597978316, 0.50883097182669357), (0.91987410679455195, 0.97753050553942622), (0.5618293073273094, 0.27688371997865069), (0.91241761244784847, 0.090310675429991605), (0.90925789663628509, 0.40628594240956295), (0.3832814495252409, 0.66221025722485627), (0.74928785967005418, 0.32840192750838815), (0.25478832731446643, 0.70269825611412617), (0.54293534537395793, 0.87800254191632932), (0.89603330911109724, 0.77106655965183546), (0.29830084404349644, 0.97117954065316903), (0.075137754060910056, 0.086473140735377596), (0.120307047737505, 0.073651360408690802), (0.87835916829742444, 0.34622147871872355), (0.20567119579830373, 0.42658381934346423), (0.27715586337053655, 0.87999487046170488), (0.16364186693234739, 0.98604111274325335), (0.31830209002283116, 0.36372930495109934), (0.73434680601907532, 0.65926820980026724), (0.9830474686174655, 0.12246834322318068), (4.0293130665095358, -3.0529459366329164), (-3.7755737603387041, 2.2685053357046323), (-2.1926920625846602, 2.4857321786911326), (5.1445647965531025, 4.8943143876324848), (0.87403644639763023, 5.6464000746270226), (-3.5545355219233219, 3.8988261206085766), (2.0785612031685732, -1.2948920530351256), (-3.4682717483474708, 2.2364561845005868), (2.0695530720860349, -2.9439062757612424), (3.9563571060210054, -2.0678946581365616), (3.2485209278176157, -2.6386418932454814), (-3.4800728241977779, 0.72646452125011518), (-1.8341241854718167, 3.3482541467971951), (-4.5558692651012178, 3.5624030818263908), (-4.6768285328272157, -1.0106699901361971), (3.9175303893386597, 0.1087117017596031), (-3.9111941479785823, 2.70001353796486), (-5.5501953466420737, -3.8544512068951891), (1.9246058344257151, 4.123740240481137), (-4.110657752575519, -2.0774760107085393), (2.6547967574269418, 4.6868873425221045), (-1.9308254017076039, -2.9448006865754279), (-3.0788555249744247, 3.396205767032443), (-4.0516249434348621, 0.42035392996461629), (-2.2989465364173602, -3.2706795830191275), (4.651698949077459, 1.1364194264447973), (3.3637257964296152, -2.5082040184760555), (-3.2502121678035314, 4.5383631321594571), (4.5274668721202556, 4.473426056956777), (3.400114365788911, -3.0434200740148363), (3.513062501300436, 2.718209259961025), (-2.3986743034356737, -4.0590996420222467), (2.6632346815268289, 4.8894243587379433), (4.2802341564965607, -3.4921791441653762), (-1.5297912885016269, 5.5780900056883569), (4.0634598983096293, -2.2904478604819776), (1.0857595813036722, 5.6366192967000295), (-4.5596385297232223, -1.3177709282351766), (-2.1361714943468244, -3.9107871995830976), (3.7240531749202161, -4.8033709892679886), (-4.1017624989859351, -0.54374796617700816), (2.3715344477591818, -3.2387553898801391), (3.8187172884547076, -5.1522284671097314), (1.0454193728074506, 3.1688190599740418), (-3.9848808505730315, -3.5176013894081675), (-4.1965918931505275, 2.0248869962483522), (3.4535361867324776, 3.4437155145638751), (-3.2171776428648808, -2.0867326734388021), (-3.5763512667620065, -3.785293447306691), (-3.2489915323631275, -4.6589505137265448), (1.2817385669950028, -4.0553290947191964), (-5.5481507299407191, 5.2080477057573553), (-2.2817876881965624, 0.12512408298772948), (-3.4831125975271719, 1.7834950195462245), (-4.2064606598908139, -3.2421411165648886), (-5.3461204499811092, 0.65966593807378215), (-0.36559473517464181, -3.9248327086099932), (-4.4223418217602317, 4.790875007038224), (-3.9026572243192548, -0.21621909226838504), (0.16100173690141428, -4.8875278273011942), (-4.2792213808538602, 1.9041297697847308), (-4.4298318748123444, -3.8717874765920124), (3.2660121035644738, 3.8922848961161609), (4.4724681658043082, -1.8875314666371643), (-3.1337207059785208, 7.2290596706950154), (5.0970619686963916, 2.4188864705446997), (-1.824501293502089, 0.87811217547665232), (2.6141377553638456, 2.4736768016729647), (-3.9646033676482686, 1.7291507868196327), (-5.6494860793108481, -1.1744278681124489), (3.3291564189715617, 3.1892910878432268), (2.6260111359196396, -4.8029748349762125), (-4.1110554486386404, 0.0087017311510849682), (-3.812034605848817, 1.8310006567642712), (-4.0643824785110239, 4.7806635726760689), (-3.8724397920934015, 0.65927045141188367), (-3.6202135060380289, -0.18281430910806151), (1.8134764145891591, -4.0328054369849538), (4.0315824591034124, -3.5339867923196042), (-3.0906912982614791, -3.8390710019489158), (0.77019164393866146, 4.0099320163703895), (-3.2239134319849398, 2.5227757084315567), (-2.5342615497190861, -4.5402720724503229), (0.52313297572359074, 5.8268409663350287), (-2.0896974241486603, -0.83931337455192145), (5.9824769771009292, 1.8062615072223389), (-1.7151819974072808, -4.6553638508191835), (-0.94296691141453703, -4.3332773280899097), (-2.9080659785364102, 3.8017876981653527), (-4.146797854411842, -2.4943345068020939), (-1.6135304662636716, -4.5968234340599352), (-5.2240732422979015, -0.40050907128273239), (3.0003615064702411, 4.3564534485947091), (1.5251603471425388, 5.3602495377614252), (0.70829180528117897, 4.8705912438690024), (-1.9857439387875215, 4.3495410597763557), (-1.7415118623160484, -2.8482449535792851), (3.1227029816875906, -3.943690794192229), (2.5533372938495322, 0.23654193364300019), (4.9320538122814632, 0.27398085527961841), (3.5379571426787906, 3.5479478416595258), (-3.9952197756192462, 0.9519866242123729), (-0.63418929807710789, 4.9714021509147459), (3.7514419719026835, -3.7952656655539831), (5.8168652955867248, -5.8059389896821614), (-3.86083201462211, 1.6763339473293351), (5.2346287443442741, -2.0049022214331869), (3.0159172780756807, -4.6747832401686313), (1.9625789720275502, 0.21332969214064601), (-5.4459656516053521, 1.8490131071943328), (5.4887755131556295, 1.0537691340713213), (4.1214658457920255, 1.8180419262808878), (1.0417225435808637, 6.4876076903545457), (5.2056831059665383, 3.4403227294912879), (-3.29183542445509, 1.1299087065549616), (-4.6894950904308068, 0.67877427899602139), (-4.2334935303450196, 0.66692066781151726), (6.918359229911677, -0.43825691963852248), (5.0912552685819197, 5.9256467457380193), (3.9995400634925016, -4.2633779062253305), (-1.3270510253578853, -2.8998811026998816), (-3.4372749748248483, -2.800876689538256), (2.5720483206059228, -4.5479241832525954), (3.5107697954439923, -5.6063323885377114), (3.45355690226015, -1.3924594206301864), (4.8170391803389006, -1.3343907023480963), (1.1592191821861308, 4.551692003143347), (-2.2147820707711716, 0.55930561729387951), (-3.2364813901253862, -1.7059292544869302), (3.5980046177747229, 3.0606302788023871), (3.0235041652892747, -0.27015781708378661), (2.4303330714757383, 3.3989583334332432), (2.4649562148782955, -4.3524552397826168), (-3.3322237797463616, 1.6813558717119386), (4.3359544685337736, 2.7104894884469877), (3.350410042767797, -3.8412188670946792), (-2.8993273426849919, 5.5101185505218293), (3.3563537615645282, 5.0439247587050282), (3.3738404946436238, -0.43277784903448813), (1.6236691719193734, -4.8192122194763103), (-4.3000303214498619, 2.7045156595962521), (3.2036876689968699, -0.22379027409222038), (5.0078193725337679, -0.33061456656172339), (1.3173753727230917, 2.3292728936983247), (0.17305051546078376, -2.3708524146324814), (0.18920570140751003, 2.7288547711089577), (4.5559793038807355, 2.4460955268542377), (-0.65537111745445098, 4.3024274811626642), (0.32733974310015845, -2.6653194005399481), (-4.3495524342659682, 0.50620561077402126), (3.6859406925109957, 1.0042337939426813), (-5.4168309661540643, -2.3784247121303279), (2.0873449293614152, 3.8206900404120345), (3.3397623772131446, -2.2347446764630474), (2.8720948774765485, 2.6955132035521556), (5.9472576652843694, -3.3542922693748149), (1.030233796538444, 1.6199282129862145), (-1.7351581782776853, -5.5709314373179808), (0.14607908112131446, 2.79251837326064), (0.37002429983216167, 4.3653059393186942), (3.8616789948811956, 3.6100436336617339), (-4.8019087210485418, -3.5911421188072357), (1.6953052292111459, -4.3928959775316905), (-1.049532260408768, -2.9169000088107522), (-4.8042700374731648, -2.6636201843555991), (2.2856117402115821, -4.497386564362329), (-1.1085015582769402, -4.1635806015318408), (-0.51764720743541925, 3.3207617687324866), (2.6552485122750968, 1.9457154950840061), (4.4574030967957459, 0.13220998701481373), (4.1064026703010086, -4.6992062016898437), (3.6218017958370492, 2.4171784152426357), (2.1893570148164336, -0.53987360896641756), (-0.62289304323418893, 5.6377915319211773), (0.95656595366184183, -3.5482370903224183), (4.6552715153624238, -0.42419842122106877), (3.9138981541477369, 1.5211086418661788), (-5.7643908686171743, 3.3462875243179644), (4.4001664954474204, 1.8715548148469952), (3.7209034976257116, -4.3132712976844925), (2.0077653108424371, -3.8044349295045858), (-2.7004396541700451, 3.6313151291578776), (2.7805282578575432, -1.3496033840422226), (2.5149407509344646, -4.4491799573779538), (-3.4969549443875327, 0.59052341158001964), (2.5871839418980924, -2.8626995345211439), (4.530084220131168, 0.73947783901217035), (-4.2278934560638541, -1.4480933790189707), (-3.6638968948801822, -1.8603129450393652), (1.0034748779660814, 4.3783603559660618), (-0.24711046251746965, 5.0245225170472958), (-0.75233017871629115, -3.4003624728787472), (-5.3204808270534789, 0.8530050107548528), (-0.66555456366565435, -3.210607962975542), (4.4312598575388913, -1.8510534338146063), (-1.0579141292803367, -3.8599892658343156), (5.1580465239922022, -1.6376354853614972), (-2.6525127599513731, 2.9406618825179196), (3.3353268107001339, 4.5193520805659642), (4.9838132614191322, -4.5937246171656669)]
from mlstatpy.graph.graphviz_helper import draw_graph_graphviz
draw_graph_graphviz(noeuds, arcs, "image.png")
from IPython.display import Image
Image("image.png", width=400)
On utilise une représentation différente d'un graphe en utilisant une classe :
class MonGraphe :
def __init__ (self, num, valeur):
self.valeur = valeur
self.num = num
self.arcs = [] # liste d’éléments MonGraphe
Du graphe comme celui ci-dessus, on ne connaît alors qu'un seul noeud appelé racine
. Pour trouver les autres noeuds, on part de la racine et on explore de proche en proche les voisins. Cette représentation est inévitable lorsqu'il s'agit d'un grand graphe comme Internet. Chaque page ou noeud ne donne accès qu'à ses voisins et il est impossible de connaître à un instant l'ensemble d'un graphe en constante évolution. L'inconvénient est qu'il n'est plus aussi évident de compter le nombre de noeuds que contient le graphe.
Ecrire une fonction qui transforme les dictionnaires noeuds
et arcs
en une liste d'éléments MonGraphe
. Il peut y avoir des arcs redondants. On appellera le premier noeud retourné par la fonction le noeud racine. On n'oubliera pas le graphe est symétrique.
def ConstruireMonGraphe (noeuds, arcs):
# ...
return mongraphe
On ajoute une méthode NombreTotalNoeud
. En principe, cette fonction devrait provoquer une erreur. Pourquoi ? On pourra s'intéresser au cas où il existe des cycles (il existe un chemin d'un noeud du graphe vers lui-même).
class MonGraphe :
def NombreTotalNoeud(self):
r = 1
for a in self.arcs:
r += a.NombreTotalNoeud()
return r
Il existe des graphes pour lesquelles cette fonction retourne le bon résultat (à savoir le nombre de noeuds), quelle particularité ont ces graphes ?
from pyquickhelper.helpgen import NbImage
NbImage("images/graph_cycle.png")
Adapter (ou réécrire) la fonction précédente pour qu'elle retourne le bon résultat quelque soit le graphe.