ABSCHAETZUNGEN FUER DIE WARTEZEITVERTEILUNGEN UND IHRER MOMENTE BEIM WARTEMODELL GI/G/1 MIT UND OHNE "ERWAERMUNG". = ESTIMATION DE LA DISTRIBUTION DE TEMPS D'ATTENTE ET DE SES MOMENTS DANS LE MODELE D'ATTENTE GI/G/1 AVEC ET SANS TEMPS "D'ECHAUFFEMENT"SIEGEL G.1974; Z. ANGEW. MATH. MECH.; DTSCH.; DA. 1974; VOL. 54; NO 10; PP. 609-619; ABS. ANGL. RUSSE; BIBL. 14 REF.Article

A SINGLE-SERVER QUEUE WITH SERVICE TIMES DEPENDING ON THE ORDER OF SERVICES.MINE H; OHNO K; KOIZUMI T et al.1976; OPER. RES.; U.S.A.; DA. 1976; VOL. 24; NO 1; PP. 188-190; BIBL. 4 REF.Article

DIE BEDEUTUNG VON KINGMANS INTEGRALUNGLEICHUNGEN BEI DER APPROXIMATION DER STATIONAEREN WARTEZEITVERTEILUNG IM MODELL GI/G/1 MIT UND OHNE VERZOEGERUNG BEIM BEGINN EINER BESCHAEFTIGUNGSPERIODE. = IMPORTANCE DES EQUATIONS INTEGRALES DE KINGMAN EN VUE DE L'APPROXIMATION DE LA DISTRIBUTION STATIONNAIRE DES TEMPS D'ATTENTE DANS UNE FILE D'ATTENTE GI/G/1, DANS LE CAS OU L'EXPEDITION COINCIDE OU NON AVEC LE DEBUT D'UNE PERIODE DE SERVICEROSSBERG HJ; SIEGEL G.1974; MATH. OPER.-FORSCH. STATIST.; DTSCH.; DA. 1974; VOL. 5; NO 9; PP. 687-699; ABS. ANGL. RUSSE; BIBL. 7 REF.Article

STOCHASTIC BOUNDS FOR THE QUEUE GI/G/1 IN HEAVY TRAFFIC.KOLLERSTROM J.1978; MATH. PROC. CAMBRIDGE PHILOS. SOC.; GBR; DA. 1978; VOL. 84; NO 2; PP. 361-375; BIBL. 22 REF.Article

ON THE COMPARISON OF WAITING TIMES IN GI/G/1 QUEUES.ROLSKI T; STOYAN D.1976; OPER. RES.; U.S.A.; DA. 1976; VOL. 24; NO 1; PP. 197-200; BIBL. 10 REF.Article

A MODIFIED ERLANG APPROACH TO APPROXIMATING GI/G/1 QUEUES.MARCHAL WG; HARRIS CM.1976; J. APPL. PROBABIL.; G.B.; DA. 1976; VOL. 13; NO 1; PP. 118-126; BIBL. 9 REF.Article

ON A GOVERNED DISCRETE GI/G/1 SYSTEM.GERGELY T; TOROK TL.sdIN: STOCHASTIC CONTROL SYMP. PREPR.; BUDAPEST; 1974; S.L.; DA. S.D.; PP. 555-559Conference Paper

The queue GI/G/1: finite moments of the cycle variables and uniform rates of convergenceTHORISSON, H.Stochastic processes and their applications. 1985, Vol 19, Num 1, pp 85-99, issn 0304-4149Article

OPERATOR-GEOMETRIC STATIONARY DISTRIBUTIONS FOR MARKOV CHAINS, WITH APPLICATION TO QUEUEING MODELSTWEEDIE RL.1982; ADV. APPL. PROBAB.; ISSN 0001-8678; GBR; DA. 1982; VOL. 14; NO 2; PP. 368-391; BIBL. 15 REF.Article

ON THE VIRTUAL AND ACTUAL WAITING TIME DISTRIBUTIONS OF A GI/G/1 QUEUE.HARRISON JM; LEMOINE AJ.1976; J. APPL. PROBABIL.; G.B.; DA. 1976; VOL. 13; NO 4; PP. 833-836; BIBL. 8 REF.Article

THE QUASI-STATIONARY DISTRIBUTIONS OF QUEUES IN HEAVY TRAFFICKYPRIANOU EK.1972; J. APPL. PROBABIL.; G.B.; DA. 1972; VOL. 9; NO 4; PP. 821-831; BIBL. 8 REF.Serial Issue

THE ACTUAL WAITING TIME OF EACH CUSTOMER IN A GI/G/I QUEUEDO LE MINH.1979; J. APPL. PROBABIL.; GBR; DA. 1979; VOL. 16; NO 4; PP. 910-916; BIBL. 11 REF.Article

ABOUT TWO INHOMOGENEOUS WIENER-HOPF INTEGRAL EQUATIONS AND THEIR INTERPRETATION FOR DELAYED RANDOM WALKS AND QUEUEING MODELS BI/G/1 WITH "WARMING-UP".MULLER I; SIEGEL G.1974; ELEKTRON. INFORM.-VERARBEIT. KYBERN.; DTSCH.; DA. 1974; VOL. 10; NO 10; PP. 609-626; ABS. ALLEM. RUSSE; BIBL. 18 REF.Article

A DISCRETE-TIME SINGLE-SERVER QUEUE WITH SET-UP TIMEDO LE MINH.1978; STOCHAST. PROCESS. APPL.; NLD; DA. 1978; VOL. 8; NO 2; PP. 181-197; BIBL. 24 REF.Article

AN EXPLICIT UPPER BOUND FOR THE MEAN BUSY PERIOD IN A GI/G/1 QUEUELOULOU R.1978; J. APPL. PROBABIL.; GBR; DA. 1978; VOL. 15; NO 2; PP. 452-455; BIBL. 7 REF.Article

USE OF THE DIFFUSION APPROXIMATION TO ESTIMATE RUN LENGTH IN SIMULATION EXPERIMENTS.MOELLER T; KOBAYASHI H.1974; IN: COMPSTAT 1974. PROC. COMPUT. STAT.; VIENNA; 1974; WIEN; RUDOLF LIEBING; DA. 1974; PP. 363-372; BIBL. 9 REF.Conference Paper

SYSTEME DE SERVICE G1(G)1 AVEC PERTES DES APPELS DANS LE CAS OU L'APPAREIL EST OCCUPEOBRETENOV A.1972; IZVEST. MAT. INST., SOFIJA; BALG.; DA. 1972; NO 13; PP. 85-92; ABS. RUSSE ANGL.; BIBL. 1 REF.Serial Issue

THE GI/G/1 QUEUE WITH LAST-COME-FIRST-SERVEDYAMAZAKI G.1982; ANNALS OF THE INSTITUTE OF STATISTICAL MATHEMATICS; ISSN 0373-5990; JPN; DA. 1982; VOL. 34; NO 3; PP. 599-604; BIBL. 3 REF.Article

ON THE MERITS OF AN "APPROXIMATION" TO THE BUSY PERIOD OF THE GI/G/1 QUEUERAMASWAMI V; LUCANTONI DM; GROSS D et al.1979; MANAG. SCI.; USA; DA. 1979; VOL. 25; NO 3; PP. 285-290; BIBL. 8 REF.Article

ASYMPTOTIC BEHAVIOUR OF WIENER-HOPF FACTORS OF A RANDOM WALK.VERAVERBEKE N.1977; STOCHAST. PROCESS. APPL.; NETHERL.; DA. 1977; VOL. 5; NO 1; PP. 27-37; BIBL. 18 REF.Article

TWO DUALITIES IN TANDEM QUEUING SYSTEMS.KAWASHIMA T.1976; MEM. DEF. ACAD.; JAP.; DA. 1976; VOL. 16; NO 3; PP. 81-88; BIBL. 10 REF.Article

RATES OF CONVERGENCE FOR QUEUES IN HEAVY TRAFFIC. IKENNEDY DP.1972; ADV. APPL. PROBAB.; G.B.; DA. 1972; VOL. 4; NO 2; PP. 357-381; BIBL. 18 REF.Serial Issue

CORRELATION FUNCTIONS IN QUEUEING THEORYSRINIVASAN SK; SUBRAMANIAN R; VASUDEVAN R et al.1972; J. APPL. PROBABIL.; G.B.; DA. 1972; VOL. 9; NO 3; PP. 604-616; BIBL. 9 REF.Serial Issue

A light traffic approximation for a single-server queueDALEY, D. J; ROLSKI, T.Mathematics of operations research. 1984, Vol 9, Num 4, pp 624-628, issn 0364-765XArticle

On the concavity of the waiting-time distribution in some GI/G/1 queuesSZEKLI, R.Journal of applied probability. 1986, Vol 23, Num 2, pp 555-561, issn 0021-9002Article