Araştırma Makalesi
BibTex RIS Kaynak Göster
Yıl 2022, Cilt: 5 Sayı: 1, 47 - 56, 31.07.2022
https://doi.org/10.55930/jonas.1105478

Öz

Kaynakça

  • 1. Arslan, C. (2016). Evaluation of Urbanization Policies in Development Plans in Turkey, (Unpublished Master's Thesis), Ardahan University, Institute of Social Sciences, Ardahan.
  • 2. Akyol, N. (1997). Problems Encountered in Zoning Practices, Trabzon.
  • 3. Büyükaslan, S. (2021). Problems Encountered in Zoning Practices and Solution Suggestions, Çanakkale Onsekiz Mart University, Graduate Education Institute, Department of Geographical Information Technologies, Master's Thesis, Çanakkale.
  • 4. Chihara, T.S. (1978). An Introduction to Orthogonal Polynomials (1st Edition), Gordon and Breach, New York.
  • 5. Çolak, N. I. (2014). Zoning Law, Twelve Plates, Istanbul.
  • 6. Dinç, H. (2019). Life Models with Fractional Polynomials, Hacettepe University Graduate School of Education, Department of Statistics, Master Thesis, Ankara.
  • 7. Gelir, M. (2021). Centralization Tendency in Zoning Plans, Yeditepe University Institute of Social Sciences, Department of Law, Master's Thesis, Istanbul.
  • 8. Kalabalık, H. (2017). Zoning Law Courses, Updated, Enlarged Eighth Edition, Seçkin Publishing House, Ankara.
  • 9. Kalbfleisch, J.;Prentice, R. L. (1980). The Statistical Analysis of Failure Time Data, Second Edition, John Wiley & Sons, Inc, New York, Chapter 4.
  • 10. Keleş, R. (2013). Urbanization Policy, 13th Edition, Imge Bookstore, Ankara.
  • 11. Lekesiz, E.G. (2021). Bivariate Finite Orthogonal Polynomial Families and Some Properties, Ankara University, Institute of Science, Department of Mathematics, PhD Thesis, Ankara.
  • 12. Planned Areas Zoning Regulation. (2017). Official Gazette (No: 30113, Date: 03/07/2017).
  • 13. Rainville, E.D. (1960). Special Functions. 1st ed., The Macmillan Company, New York.
  • 14. Szego, G. (1975). Orthogonal Polynomials. American Mathematical Society Colloquium Publications, 23, 4th ed. American Mathematical Society, Providence, Rhode Island.
  • 15. Sanli, D. (2009). “Analysis of Planning Authority”, Journal of Ankara Bar Association, 3, p. 47-58.
  • 16. Taştan, M. (2021). Gaussian Number Sequences and Polynomials, Erzincan Binali Yıldırım University, Institute of Science and Technology, Department of Mathematics, PhD Thesis, Erzincan.
  • 17. Tereszkiewicz, A., Wawreniuk, I. (2015). Generalized Jacobsthal polynomials and special points for them, Applied Mathematics and Computation, 268, 806–814. DOI:10.1016/j.amc.2015.07.002.
  • 18. Ulutas, T. B. (2021). Public Interest Criteria in Judicial Supervision of Zoning Plans, Pamukkale University Institute of Social Sciences, Department of Political Science and Public Administration, PhD Thesis, Denizli. 19. Utkucu, T.;Çağlan, E. (2019). Rant İmar İtibar, Twelve Plates, Istanbul.
  • 20. Yıldırım, S.M. (2022). Discrete Bivariate Orthogonal Polynomials, Ankara University, Institute of Science and Technology, Department of Mathematics, Master's Thesis, Ankara.
  • 21. Yıldız, F. (2016). Zoning Information. Planning, Implementation, Legislation, Nobel Yayın Dağıtım, Ankara.
  • 22. Yomralıoğlu, T. (1997). Development Plan Implementation Techniques in Urban Area Arrangements, Trabzon. 32- 39.

BUILDING RESIDENCE AREA EXTRACTION PROCESS WITH POLYNOMIAL APPROACH IN FREE BUILDING IDENTITY ZONING PLOTS

Yıl 2022, Cilt: 5 Sayı: 1, 47 - 56, 31.07.2022
https://doi.org/10.55930/jonas.1105478

Öz

The zoning islands in the identity of free buildings are one of the island types in the zoning plan. It has an aspect that distinguishes it from the zoning islands with certain definite features such as separate, block and adjacent. It is a building regulation in the identity of a zoning island, which is applicable in application zoning plans, especially in new development and settlement areas. On the islands with the identity of free construction, the building permit withdrawal dimensions are given on the basis of different precedents. As a method, it has been tried to be explained with examples on how to draw the parcels to the base according to certain rules with polynomial nesting. The polynomial is mathematically the process of constructing subsets or subsets from the universal set. In planning applications, it is the process of creating the right building stock by specifying the garden distances from the outside to the inside. Especially in the identity of free building, the most important part in these garden distances is to create the building sitting area by pulling the right side garden. In this way, an examination was made about how a different approach in the zoning plans will be given to the zoning islands with the identity of free buildings from general to specific.

Kaynakça

  • 1. Arslan, C. (2016). Evaluation of Urbanization Policies in Development Plans in Turkey, (Unpublished Master's Thesis), Ardahan University, Institute of Social Sciences, Ardahan.
  • 2. Akyol, N. (1997). Problems Encountered in Zoning Practices, Trabzon.
  • 3. Büyükaslan, S. (2021). Problems Encountered in Zoning Practices and Solution Suggestions, Çanakkale Onsekiz Mart University, Graduate Education Institute, Department of Geographical Information Technologies, Master's Thesis, Çanakkale.
  • 4. Chihara, T.S. (1978). An Introduction to Orthogonal Polynomials (1st Edition), Gordon and Breach, New York.
  • 5. Çolak, N. I. (2014). Zoning Law, Twelve Plates, Istanbul.
  • 6. Dinç, H. (2019). Life Models with Fractional Polynomials, Hacettepe University Graduate School of Education, Department of Statistics, Master Thesis, Ankara.
  • 7. Gelir, M. (2021). Centralization Tendency in Zoning Plans, Yeditepe University Institute of Social Sciences, Department of Law, Master's Thesis, Istanbul.
  • 8. Kalabalık, H. (2017). Zoning Law Courses, Updated, Enlarged Eighth Edition, Seçkin Publishing House, Ankara.
  • 9. Kalbfleisch, J.;Prentice, R. L. (1980). The Statistical Analysis of Failure Time Data, Second Edition, John Wiley & Sons, Inc, New York, Chapter 4.
  • 10. Keleş, R. (2013). Urbanization Policy, 13th Edition, Imge Bookstore, Ankara.
  • 11. Lekesiz, E.G. (2021). Bivariate Finite Orthogonal Polynomial Families and Some Properties, Ankara University, Institute of Science, Department of Mathematics, PhD Thesis, Ankara.
  • 12. Planned Areas Zoning Regulation. (2017). Official Gazette (No: 30113, Date: 03/07/2017).
  • 13. Rainville, E.D. (1960). Special Functions. 1st ed., The Macmillan Company, New York.
  • 14. Szego, G. (1975). Orthogonal Polynomials. American Mathematical Society Colloquium Publications, 23, 4th ed. American Mathematical Society, Providence, Rhode Island.
  • 15. Sanli, D. (2009). “Analysis of Planning Authority”, Journal of Ankara Bar Association, 3, p. 47-58.
  • 16. Taştan, M. (2021). Gaussian Number Sequences and Polynomials, Erzincan Binali Yıldırım University, Institute of Science and Technology, Department of Mathematics, PhD Thesis, Erzincan.
  • 17. Tereszkiewicz, A., Wawreniuk, I. (2015). Generalized Jacobsthal polynomials and special points for them, Applied Mathematics and Computation, 268, 806–814. DOI:10.1016/j.amc.2015.07.002.
  • 18. Ulutas, T. B. (2021). Public Interest Criteria in Judicial Supervision of Zoning Plans, Pamukkale University Institute of Social Sciences, Department of Political Science and Public Administration, PhD Thesis, Denizli. 19. Utkucu, T.;Çağlan, E. (2019). Rant İmar İtibar, Twelve Plates, Istanbul.
  • 20. Yıldırım, S.M. (2022). Discrete Bivariate Orthogonal Polynomials, Ankara University, Institute of Science and Technology, Department of Mathematics, Master's Thesis, Ankara.
  • 21. Yıldız, F. (2016). Zoning Information. Planning, Implementation, Legislation, Nobel Yayın Dağıtım, Ankara.
  • 22. Yomralıoğlu, T. (1997). Development Plan Implementation Techniques in Urban Area Arrangements, Trabzon. 32- 39.
Toplam 21 adet kaynakça vardır.

Ayrıntılar

Birincil Dil İngilizce
Konular Mühendislik
Bölüm Makaleler
Yazarlar

Selim Taşkaya 0000-0002-4290-3684

Yayımlanma Tarihi 31 Temmuz 2022
Yayımlandığı Sayı Yıl 2022 Cilt: 5 Sayı: 1

Kaynak Göster

APA Taşkaya, S. (2022). BUILDING RESIDENCE AREA EXTRACTION PROCESS WITH POLYNOMIAL APPROACH IN FREE BUILDING IDENTITY ZONING PLOTS. Bartın University International Journal of Natural and Applied Sciences, 5(1), 47-56. https://doi.org/10.55930/jonas.1105478
AMA Taşkaya S. BUILDING RESIDENCE AREA EXTRACTION PROCESS WITH POLYNOMIAL APPROACH IN FREE BUILDING IDENTITY ZONING PLOTS. JONAS. Temmuz 2022;5(1):47-56. doi:10.55930/jonas.1105478
Chicago Taşkaya, Selim. “BUILDING RESIDENCE AREA EXTRACTION PROCESS WITH POLYNOMIAL APPROACH IN FREE BUILDING IDENTITY ZONING PLOTS”. Bartın University International Journal of Natural and Applied Sciences 5, sy. 1 (Temmuz 2022): 47-56. https://doi.org/10.55930/jonas.1105478.
EndNote Taşkaya S (01 Temmuz 2022) BUILDING RESIDENCE AREA EXTRACTION PROCESS WITH POLYNOMIAL APPROACH IN FREE BUILDING IDENTITY ZONING PLOTS. Bartın University International Journal of Natural and Applied Sciences 5 1 47–56.
IEEE S. Taşkaya, “BUILDING RESIDENCE AREA EXTRACTION PROCESS WITH POLYNOMIAL APPROACH IN FREE BUILDING IDENTITY ZONING PLOTS”, JONAS, c. 5, sy. 1, ss. 47–56, 2022, doi: 10.55930/jonas.1105478.
ISNAD Taşkaya, Selim. “BUILDING RESIDENCE AREA EXTRACTION PROCESS WITH POLYNOMIAL APPROACH IN FREE BUILDING IDENTITY ZONING PLOTS”. Bartın University International Journal of Natural and Applied Sciences 5/1 (Temmuz 2022), 47-56. https://doi.org/10.55930/jonas.1105478.
JAMA Taşkaya S. BUILDING RESIDENCE AREA EXTRACTION PROCESS WITH POLYNOMIAL APPROACH IN FREE BUILDING IDENTITY ZONING PLOTS. JONAS. 2022;5:47–56.
MLA Taşkaya, Selim. “BUILDING RESIDENCE AREA EXTRACTION PROCESS WITH POLYNOMIAL APPROACH IN FREE BUILDING IDENTITY ZONING PLOTS”. Bartın University International Journal of Natural and Applied Sciences, c. 5, sy. 1, 2022, ss. 47-56, doi:10.55930/jonas.1105478.
Vancouver Taşkaya S. BUILDING RESIDENCE AREA EXTRACTION PROCESS WITH POLYNOMIAL APPROACH IN FREE BUILDING IDENTITY ZONING PLOTS. JONAS. 2022;5(1):47-56.