202 research outputs found
Adaptive Port Masterplanning for Europoort at Port of Rotterdam
Waterborne transport infrastructures play a crucial role in global integration, and ports are key components to materialise this amalgamation. However they are constantly challenged to keep fulfilling their functions in a changing environment. Port of Rotterdam, the largest port in Europe and the Western hemisphere too, faces those challenges on a daily basis. In order to maintain and enhance the future efficiency of the Harbour Industrial Complex, strategic adaptations based on long-term planning are required. This is more relevant on those existing port areas such as Europoort, where basic infrastructure is approaching the end of their life cycle, and fragmentation of original plots led to inefficient use of the land and some waterfront areas. In order to meet these needs, this study presents the application of Adaptive Port Planning framework (Taneja, 2013) to the existing Europoort Masterplan for increasing its robustness while ensuring that the port has the license-to-operate and the license-to-grow in the long-term. The Adaptive Port Planning approach goes further than the traditional port planning approach throughout incorporating uncertainty and flexibility considerations. Furthermore, this project also integrates the PIANC Green Ports approach (PIANC, 2014), as well as other existing frameworks towards a sustainable growth of the port.Hydraulic EngineeringCivil Engineering and Geoscience
Bordered and Pandiagonal Magic Squares Multiples of 7
During past years author worked with block-wise bordered magic squares of even orders. It includes blocks of orders 4, 6, 8, 10, etc. Most of the cases are with equal sums magic squares. This type of work is an extension of classical bordered magic squares. In case of multiples of 4, the extension is made for pandiagonal magic squares (click here). For multiples of order 6 refer Taneja (click here). For the first time, we are presenting here bordered magic squares of odd number blocks. Recently, author worked on mutiples of 3 and 5, based on different sums magic squares of orders 3 and 5 (order3, order5). This work is for borders of magic squares of order 7. It is done with two types of magic squares of order 7. One type is pandiagonal magic squares, and another as bordered magic squares. This work is up to order 49. Higher orders examples can be seen in Excel file attached with the work. The total work is up to order 140. Pandiagonal magic squares based on equal sums pandiagonal magic squares of order 7 are also included in Excel file
Block-Wise Bordered and Pandiagonal Magic Squares Multiples of 7
During past years author worked with block-wise bordered magic squares of even orders. It includes blocks of orders 4, 6, 8, 10, etc. Most of the cases are with equal sums magic squares. This type of work is an extension of classical bordered magic squares. In case of multiples of 4, the extension is made for pandiagonal magic squares (click here). For multiples of order 6 refer Taneja (click here). For the first time, we are presenting here bordered magic squares of odd number blocks. Recently, author worked on mutiples of 3 and 5, based on different sums magic squares of orders 3 and 5 (order3, order5). This work is for borders of magic squares of order 7. It is done with two types of magic squares of order 7. One type is pandiagonal magic squares, and another as bordered magic squares. This work is up to order 49. Higher orders examples can be seen in Excel file attached with the work. The total work is up to order 140. Pandiagonal magic squares based on equal sums pandiagonal magic squares of order 7 are also included in Excel file
Block-Wise Bordered and Pentagonal Magic Squares Multiples of 5
During past years author worked with block-wise bordered magic squares of even orders. It includes blocks of orders 4, 6, 8, 10, etc. Most of the cases are with equal sums magic squares. This type of work is an extension of classical bordered magic squares. In case of multiples of 4, the extension is made for pentagonal magic squares (click here). For multiples of order 6 refer Taneja (click here). For the first time, we are presenting here bordered magic squares of odd number blocks. Recently, author worked on mutiples of 3, based on different sums magic squares of order 3 (click here). This work is for borders of magic squares of order 5. It is done with two types of magic squares of order 5. One type is pandiagonal magic squares, and another as bordered magic squares. This work is up to order 40. Higher orders examples can be seen in Excel file attached with the work. The total work is up to order 150. Pandiagonal magic squares based on equal sums pandiagonal magic squares of order 5 are also included in Excel file
Bordered and Pentagonal Magic Squares Multiples of 5
During past years author worked with block-wise bordered magic squares of even orders. It includes blocks of orders 4, 6, 8, 10, etc. Most of the cases are with equal sums magic squares. This type of work is an extension of classical bordered magic squares. In case of multiples of 4, the extension is made for pentagonal magic squares (click here). For multiples of order 6 refer Taneja (click here). For the first time, we are presenting here bordered magic squares of odd number blocks. Recently, author worked on mutiples of 3, based on different sums magic squares of order 3 (click here). This work is for borders of magic squares of order 5. It is the revison over the previous work. It is done with three types of magic squares of order 5. One type is pandiagonal magic squares, the second type is bordered magic square. The third type is cornered magic square. This work is up to order 35. Higher orders examples can be seen in Excel file attached with the work. The total work is up to order 150. Pandiagonal magic squares based on equal sums pandiagonal magic squares of order 5 are also included in Excel file
Part I - Ch 2 A constant need for change
Rivers, Ports, Waterways and Dredging Engineerin
Bordered and Pentagonal Magic Squares Multiples of 5
<p>During past years author worked with <strong>block-wise bordered</strong> magic squares of even orders. It includes blocks of orders 4, 6, 8, 10, etc. Most of the cases are with equal sums magic squares. This type of work is an extension of classical bordered magic squares. In case of multiples of 4, the extension is made for <strong>pentagonal</strong> magic squares (<a href="https://doi.org/10.5281/zenodo.5347897">click here</a>). For multiples of order 6 refer Taneja (<a href="https://doi.org/10.5281/zenodo.5500134">click here</a>). For the first time, we are presenting here bordered magic squares of odd number blocks. Recently, author worked on mutiples of 3, based on different sums magic squares of order 3 (<a href="https://doi.org/10.5281/zenodo.7898383">click here</a>). This work is for borders of magic squares of order 5. It is the revison over the previous work. It is done with three types of magic squares of order 5. One type is <strong>pandiagonal</strong> magic squares, the second type is <strong>bordered </strong>magic square. The third type is <strong>cornered</strong> magic square. This work is up to order 35. Higher orders examples can be seen in <strong>Excel file</strong> attached with the work. The total work is up to order 150. <strong>Pandiagonal</strong> magic squares based on equal sums <strong>pandiagonal</strong> magic squares of order 5 are also included in <strong>Excel file</strong>.</p>
Molecular characterization and differential expression suggested diverse functions of P-type II Ca2+ATPases in Triticum aestivum L
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