Araştırma Makalesi
Yıl 2018,
Cilt: 31 Sayı: 4, 1202 - 1211, 01.12.2018
Öz
Kaynakça
- Ahmadi, S. A., ” Generalized topological groups and genetic recombination.”, J Dyn Syst Geom Theor 11: 51-58, (2013).
- Adénìran, J. O., Akinmoyewa, J. T., Şòlàìrìn, A. R. T. and Jaiyéo, T. G., “On some algebraic properties of generalized groups”, Octogon Mathematical Magazine 17: 125-134, (2009).
- Baues, H. J., Commutator Calculus and Groups of Homotopy Classes, Cambridge, (1981).
- Brown, R., “A geometric account of general topology., Homotopy Types and Fundemental Groupoid”, Ellis Horwood, Chichester, (1988).
- Cartan, H., Seminaire de L’ Ecole Normale Superiure, (1950-1951).
- Gray, B., Homotopy Theory, Academic Press New York San Francisco London, (1975).
- Grauert, H., Remmert, R., Coherent Analytic Sheaves, Springer-Verlag, New York San Francisco London, (1984).
- Hofmann, K. H., Mostert, P.S., Elements of Compact Semigroups, Charles E. Merrill Books, Inc., (1966).
- Icen, I. “ Demetler uzerine”, M. SC. Thesis, Inonu University Institute of Science, Malatya, (1989).
- Leray, J., C.R. Acad. Sci. (Paris), 232 p. 1366., (1946).
- Mehrabi, M., Molaei, M. R. and Olomi., A. “Generalized subgroups and homomorphisms.”, Arab J Math Sci 6: 1-7, (2000). Molaei, M. R., “Connected topological generalized groups”, General Mathematics Vol. 12, No. 1: 13–22, (2004).
- Molaei, M. R., “Topological generalized groups”, International Journal of Pure and Applied Mathematics, Vol. 2(9): 1055-1060, (2000).
- Molaei, M. R., “Generalized groups”, International Conference on Algebra, October 14-17, Romania, (1998), Buletinul Institului Polithnic DinIasi, Tomul XLV (XLIX) :21-24, (1999).
- Molaei, M. R., Generalized Structures Based on Completely Simple Semigroups, USA; Hadronic Press, Florida, (2005).
- Molaei, M. R., “Generalized actions”, In: Ivailo, M. Mladenov, Gregory L. Naber, editors. Intenational Conference on Geometry, Integrability and Quantization, 1-10 September (1999); Varna, Bulgaria. Sofia: Coral Press, 175-179, (1999).
- Spainer, E. H., Algebraic Topology, Mc Graw-Hill Publishing Company Theory, (1966).
- Sze-Tse, H., “Structure of the homotopy groups of mapping spaces”, American Journal of Mathematics, Vol. LXXI, No:3: 574-586, (1949).
- Whitehead, G. W., Elements of Homotopy Theory, Springer-Verlag, (1978).
- Yıldız, C., “Topolojik uzaylar uzerinde topolojik grubun olusturdugu gruplarin demeti”, Erc. Uni. Fen Bil. Derg., 7(1): 1112-1120, (1991).
Yıl 2018,
Cilt: 31 Sayı: 4, 1202 - 1211, 01.12.2018
Öz
In the present paper, we show how to construct an
algebraic sheaf by means of the toplogical generalized group defined by Molaei
in [1] by considering both homotopy and sheaf theory.
algebraic sheaf by means of the toplogical generalized group defined by Molaei
in [1] by considering both homotopy and sheaf theory.
Anahtar Kelimeler
Generalized group Topological generalized group Whitney sum Sheaf
Kaynakça
- Ahmadi, S. A., ” Generalized topological groups and genetic recombination.”, J Dyn Syst Geom Theor 11: 51-58, (2013).
- Adénìran, J. O., Akinmoyewa, J. T., Şòlàìrìn, A. R. T. and Jaiyéo, T. G., “On some algebraic properties of generalized groups”, Octogon Mathematical Magazine 17: 125-134, (2009).
- Baues, H. J., Commutator Calculus and Groups of Homotopy Classes, Cambridge, (1981).
- Brown, R., “A geometric account of general topology., Homotopy Types and Fundemental Groupoid”, Ellis Horwood, Chichester, (1988).
- Cartan, H., Seminaire de L’ Ecole Normale Superiure, (1950-1951).
- Gray, B., Homotopy Theory, Academic Press New York San Francisco London, (1975).
- Grauert, H., Remmert, R., Coherent Analytic Sheaves, Springer-Verlag, New York San Francisco London, (1984).
- Hofmann, K. H., Mostert, P.S., Elements of Compact Semigroups, Charles E. Merrill Books, Inc., (1966).
- Icen, I. “ Demetler uzerine”, M. SC. Thesis, Inonu University Institute of Science, Malatya, (1989).
- Leray, J., C.R. Acad. Sci. (Paris), 232 p. 1366., (1946).
- Mehrabi, M., Molaei, M. R. and Olomi., A. “Generalized subgroups and homomorphisms.”, Arab J Math Sci 6: 1-7, (2000). Molaei, M. R., “Connected topological generalized groups”, General Mathematics Vol. 12, No. 1: 13–22, (2004).
- Molaei, M. R., “Topological generalized groups”, International Journal of Pure and Applied Mathematics, Vol. 2(9): 1055-1060, (2000).
- Molaei, M. R., “Generalized groups”, International Conference on Algebra, October 14-17, Romania, (1998), Buletinul Institului Polithnic DinIasi, Tomul XLV (XLIX) :21-24, (1999).
- Molaei, M. R., Generalized Structures Based on Completely Simple Semigroups, USA; Hadronic Press, Florida, (2005).
- Molaei, M. R., “Generalized actions”, In: Ivailo, M. Mladenov, Gregory L. Naber, editors. Intenational Conference on Geometry, Integrability and Quantization, 1-10 September (1999); Varna, Bulgaria. Sofia: Coral Press, 175-179, (1999).
- Spainer, E. H., Algebraic Topology, Mc Graw-Hill Publishing Company Theory, (1966).
- Sze-Tse, H., “Structure of the homotopy groups of mapping spaces”, American Journal of Mathematics, Vol. LXXI, No:3: 574-586, (1949).
- Whitehead, G. W., Elements of Homotopy Theory, Springer-Verlag, (1978).
- Yıldız, C., “Topolojik uzaylar uzerinde topolojik grubun olusturdugu gruplarin demeti”, Erc. Uni. Fen Bil. Derg., 7(1): 1112-1120, (1991).
Toplam 19 adet kaynakça vardır.
Ayrıntılar
| Birincil Dil | İngilizce |
|---|---|
| Konular | Mühendislik |
| Bölüm | Mathematics |
| Yazarlar | |
| Yayımlanma Tarihi | 1 Aralık 2018 |
| Yayımlandığı Sayı | Yıl 2018 Cilt: 31 Sayı: 4 |