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The first 3 dimensions of torus network topology are easier to visualize and are described below:
The first 3 dimensions of torus network topology are easier to visualize and are described below:
<gallery>
<gallery>
1d torus.png|illustration of 1D Torus
1d torus.png|1D Torus illustration
2d torus.png|illustration of 2D Torus
2d torus.png|2D Torus illustration
3d torus.png|illustration of 3D Torus
3d torus.png|3D Torus illustration
</gallery>
</gallery>
*1D Torus: it is one dimension, ''n'' nodes are connected in closed loop with each node connected to its 2 nearest neighbors communication can take place in 2 directions, +x and −x. 1D torus is same as [[Ring network|ring interconnection]].
*1D Torus: it is one dimension, ''n'' nodes are connected in closed loop with each node connected to its 2 nearest neighbors communication can take place in 2 directions, +x and −x. 1D Torus is same as [[Ring network|ring interconnection]].
* 2D Torus: it is two dimension with degree of 4, the nodes are imagined laid out in a two-dimensional rectangular lattice of n rows and n columns, with each node connected to its 4 nearest neighbors, and corresponding nodes on opposite edges connected. The connection of opposite edges can be visualized by rolling the rectangular array into a "tube" to connect two opposite edges and then bending the "tube" into a torus to connect the other two. communication can take place in 4 directions, +x, −x, +y, and −y. The total nodes of 2D Torus is ''n''<sup>2</sup>
* 2D Torus: it is two dimension with degree of 4, the nodes are imagined laid out in a two-dimensional rectangular lattice of n rows and n columns, with each node connected to its 4 nearest neighbors, and corresponding nodes on opposite edges connected. The connection of opposite edges can be visualized by rolling the rectangular array into a "tube" to connect two opposite edges and then bending the "tube" into a torus to connect the other two. communication can take place in 4 directions, +x, −x, +y, and −y. The total nodes of 2D Torus is ''n''<sup>2</sup>.
* 3D Torus: it is three dimension, the nodes are imagined in a three-dimensional lattice in the shape of a rectangular prism, with each node connected with its 6 neighbors, with corresponding nodes on opposing faces of the array connected. Each edge consists of ''n'' nodes. communication can take place in 6 directions, +x, −x, +y, −y, +z, −z. Each edge of 3D Torus consist of n nodes. The total nodes of 3D Torus is ''n''<sup>3</sup>
* 3D Torus: it is three dimension, the nodes are imagined in a three-dimensional lattice in the shape of a rectangular prism, with each node connected with its 6 neighbors, with corresponding nodes on opposing faces of the array connected. Each edge consists of ''n'' nodes. communication can take place in 6 directions, +x, −x, +y, −y, +z, −z. Each edge of 3D Torus consist of n nodes. The total nodes of 3D Torus is ''n''<sup>3</sup>.
* ND Torus: it can have ''N'' dimension, each node of ''N'' dimension torus has 2N neighbors, communication can take place in 2N directions. Each edge consists of n nodes. Total nodes of this torus is ''n''<sup>''N''</sup>. The main motivation of having higher dimension of torus is to achieve higher bandwidth, lower latency, and higher scalability.
* ND Torus: it can have ''N'' dimension, each node of ''N'' dimension torus has 2N neighbors, communication can take place in 2N directions. Each edge consists of n nodes. Total nodes of this torus is ''n''<sup>''N''</sup>. The main motivation of having higher dimension of torus is to achieve higher bandwidth, lower latency, and higher scalability.



Revision as of 15:10, 23 June 2022

A torus interconnect is a switch-less network topology for connecting processing nodes in a parallel computer system.

Diagram of a 3-dimensional torus interconnect. It is not limited to 8 nodes but can consist of any number of nodes in a similar rectilinear array.

Introduction

In geometry, a torus is created by revolving a circle about an axis coplanar to the circle. While this is a general definition in geometry, the topological properties of this type of shape describes the network topology in its essence.

Geometry illustration

The following images are 1D, and 2D torus. 1D torus is a simple circle, and 2D torus has the shape of a doughnut. The animation below illustrates how a 2D torus is generated from a rectangle by connecting its two pairs of opposite edges. Here the concept of torus is used to describe essentially the beginning and ending of a sequence of nodes are connected, like a doughnut. To better illustrate the concept, and understand what the topology means in network interconnect, we give 3 examples of parallel interconnected nodes using torus topology. At one dimension, a torus topology is equivalent to a ring interconnect network, of a shape of a circle. At 2D, it is equivalent to a 2D mesh, but with extra connection at the edge nodes, which is the definition of 2D torus.

Torus network topology

We can generalize the rule from the figures above. Torus interconnect is a switch-less topology that can be seen as a mesh interconnect with nodes arranged in a rectilinear array of N = 2, 3, or more dimensions, with processors connected to their nearest neighbors, and corresponding processors on opposite edges of the array connected.[1] In this lattice, each node has 2N connections. This topology got the name from the fact that the lattice formed in this way is topologically homogeneous to an N-dimensional torus.

Visualization

The first 3 dimensions of torus network topology are easier to visualize and are described below:

  • 1D Torus: it is one dimension, n nodes are connected in closed loop with each node connected to its 2 nearest neighbors communication can take place in 2 directions, +x and −x. 1D Torus is same as ring interconnection.
  • 2D Torus: it is two dimension with degree of 4, the nodes are imagined laid out in a two-dimensional rectangular lattice of n rows and n columns, with each node connected to its 4 nearest neighbors, and corresponding nodes on opposite edges connected. The connection of opposite edges can be visualized by rolling the rectangular array into a "tube" to connect two opposite edges and then bending the "tube" into a torus to connect the other two. communication can take place in 4 directions, +x, −x, +y, and −y. The total nodes of 2D Torus is n2.
  • 3D Torus: it is three dimension, the nodes are imagined in a three-dimensional lattice in the shape of a rectangular prism, with each node connected with its 6 neighbors, with corresponding nodes on opposing faces of the array connected. Each edge consists of n nodes. communication can take place in 6 directions, +x, −x, +y, −y, +z, −z. Each edge of 3D Torus consist of n nodes. The total nodes of 3D Torus is n3.
  • ND Torus: it can have N dimension, each node of N dimension torus has 2N neighbors, communication can take place in 2N directions. Each edge consists of n nodes. Total nodes of this torus is nN. The main motivation of having higher dimension of torus is to achieve higher bandwidth, lower latency, and higher scalability.

Higher-dimensional arrays are difficult to visualize but we can see from above rule that each higher dimension adds another pair of nearest neighbor connections to each node.

Performance

A number of supercomputers on the TOP500 list use three-dimensional torus networks, e.g. IBM's Blue Gene/L and Blue Gene/P, and the Cray XT3.[1] IBM's Blue Gene/Q uses a five-dimensional torus network. Fujitsu's K computer and the PRIMEHPC FX10 use a proprietary three-dimensional torus 3D mesh interconnect called Tofu.[2]

3D Torus performance simulation

Sandeep Palur and Dr. Ioan Raicu from Illinois Institute of Technology conducted experiments to simulate 3D torus performance. Their experiments ran on a computer with 250GB RAM, 48 cores and x86_64 architecture. The simulator they used was ROSS (Rensselaer’s Optimistic Simulation System). They mainly focused on three aspects 1. Varying network size 2. Varying number of servers 3. Varying message size. They concluded that throughput decreases with the increase of servers and network size. Otherwise, throughput increases with the increase of message size.[3]

6D Torus product performance

Fujitsu Limited developed a 6D torus computer model called "Tofu". In their model, a 6D torus can achieve 100 GB/s off-chip bandwidth, 12 times higher scalability than a 3D torus, and high fault tolerance. The model is used in the K computer and Fugaku.[4]

Advantages and disadvantages

Advantages

Higher speed, lower latency
Because of the connection of opposite edges, data have more options to travel from one node to another which greatly increased speed.
Better fairness
In a 4×4 mesh interconnect, the longest distance between nodes is from upper left corner to lower right corner. Each datum takes 6 hops to travel the longest path. But in a 4×4 Torus interconnect, upper left corner can travel to lower right corner with only 2 hops
Lower energy consumption
Since data tend to travel fewer hops, the energy consumption tends to be lower.

Disadvantages

Complexity of wiring
Extra wires can make the routing process in the physical design phase more difficult. If we want to lay out more wires on chip, it is likely that we need to increase the number of metal layers or decrease density on chip, which is more expensive. Otherwise, the wires that connect opposite edges can be much longer than other wires. This inequality of link lengths can cause problems because of RC delay.
Cost
While long wrap-around links may be the easiest way to visualize the connection topology, in practice, restrictions on cable lengths often make long wrap-around links impractical. Instead, directly connected nodes—including nodes that the above visualization places on opposite edges of a grid, connected by a long wrap-around link—are physically placed nearly adjacent to each other in a folded torus network.[5][6] Every link in the folded torus network is very short—almost as short as the nearest-neighbor links in a simple grid interconnect—and therefore low-latency.[7]

See also

References

  1. ^ N. R. Agida et al. 2005 Blue Gene/L Torus Interconnection Network, IBM Journal of Research and Development, Vol 45, No 2/3 March–May 2005 page 265 "Archived copy" (PDF). Archived from the original (PDF) on 2011-08-15. Retrieved 2012-02-09.{{cite web}}: CS1 maint: archived copy as title (link)
  2. ^ Fujitsu Unveils Post-K Supercomputer HPC Wire Nov 7 2011
  3. ^ Sandeep, Palur; Raicu, Dr. Ioan. "Understanding Torus Network Performance through Simulations" (PDF). Retrieved 28 November 2016.
  4. ^ Inoue, Tomohiro. "The 6D Mesh/Torus Interconnect of K Computer" (PDF). Fujitsu. Retrieved 28 November 2016.
  5. ^ "Small-World Torus Topology".
  6. ^ Pavel Tvrdik. "Topics in parallel computing: Embeddings and simulations of INs: Optimal embedding of tori into meshes".
  7. ^ "The 3D Torus architecture and the Eurotech approach".