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Wani, M. S.
- Root Distribution Pattern of Walnut (juglans Regia L.)
Abstract Views :339 |
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Authors
K. R. Dar
1,
M. S. Wani
2,
G. R. Najar
2,
F. A. Peer
2,
M. A. Chattoo
2,
S. A. Simnani
2,
Angrej Ali
2
Affiliations
1 S.K. University of Agricultural Sciences and Technology (K), Shalimar, Srinagar J&K, IN
2 S.K. University of Agricultural Sciences and Technology (K), Shalimar,Srinagar J&K, IN
1 S.K. University of Agricultural Sciences and Technology (K), Shalimar, Srinagar J&K, IN
2 S.K. University of Agricultural Sciences and Technology (K), Shalimar,Srinagar J&K, IN
Source
The Asian Journal of Horticulture, Vol 8, No 2 (2013), Pagination: 452-455Abstract
Root distribution pattern of walnut trees grafted on seedling ischolar_mainstock was studied on at three radial distances from tree trunk and soil depth. The length and mass of fine ischolar_mains (diameter less than 1mm) was maximum (2633.52 cm and 19.43 g, respectively) within the tree canopy i.e. at a distance 2/3rd from tree trunk to drip line. It was significantly low near the tree trunk and towards the drip line. The length and mass of the fine ischolar_mains was more in the surface layer (2498.65 cm and 14.22 g, respectively). As the soil depth increased the RLD and RMD of the fine ischolar_mains decreased significantly. RLD of thicker ischolar_mains was not significantly influenced by the radial distance from the tree trunk but the RMD decreased significantly from the tree trunk to the drip line. Thicker ischolar_mains were significantly more in the surface layer of the soil.Keywords
Walnut, Root Distribution, Soil Depth, Radial Distance- Optimal Allocation of Stratified Sampling Design Using Gradient Projection Method
Abstract Views :244 |
PDF Views:4
Authors
Affiliations
1 Division of Agri.stat, SKUAST-K, Kashmir, IN
1 Division of Agri.stat, SKUAST-K, Kashmir, IN
Source
Oriental Journal of Computer Science and Technology, Vol 10, No 1 (2017), Pagination: 11-17Abstract
This article deals with the problem of finding an optimal allocation of sample sizes in stratified sampling design to minimize the cost function. In this paper the iterative procedure of Rosen’s Gradient projection method is used to solve the Non linear programming problem (NLPP), when a non integer solution is obtained after solving the NLPP then Branch and Bound method provides an integer solution.Keywords
Stratification, Optimal Allocation, Nonlinear Programming, Gradient Projection Method, Branch and Bound Method and Integer Allocation.References
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- An Integer solution in Intuitionistic Transportation Problem with Application in Agriculture
Abstract Views :233 |
PDF Views:7
Authors
Affiliations
1 Division of Agric. Stat., SKUAST-K, Kashmir, IN
1 Division of Agric. Stat., SKUAST-K, Kashmir, IN
Source
Oriental Journal of Computer Science and Technology, Vol 10, No 1 (2017), Pagination: 18-23Abstract
In this paper, we investigate a Transportation problem which is a special kind of linear programming in which profits; supply and demands are considered as Intuitionistic triangular fuzzy numbers. The crisp values of these Intuitionistic triangular fuzzy numbers are obtained by defuzzifying them and the problem is formulated into linear programming problem. The solution of the formulated problem is obtained through LINGO software. If the obtained solution is non-integer then Branch and Bound method can be used to obtain an integer solution.Keywords
Transportation Problem, Intuitionistic Triangular Fuzzy Numbers, Maximized Profit, Branch And Bound Method, Optimal Allocation and LINGO.References
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