Difference between revisions of "List space"

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[[Category:Nodal Concepts]]
 
__NOTOC__
 
 
The Nodes are relatively high-level structures and at ''[[Wikipedia:Runtime|runtime]]'' within the peer-nodes they sit upon a more fundamental layer called ''list space'' in which the actual nodal change takes place in a peer.
 
The Nodes are relatively high-level structures and at ''[[Wikipedia:Runtime|runtime]]'' within the peer-nodes they sit upon a more fundamental layer called ''list space'' in which the actual nodal change takes place in a peer.
  
= List items =
+
== List items ==
 
The project uses a very fundamental memory model based on binary sequences. The entire memory can be divided into groups of smaller sequences which can themselves each be referred to by a locally unique binary sequence. For example, a 16 megabyte section of RAM can be divided into two million 64-bit sequences. ''List-space'' uses blocks of binary as its local memory resource and divides the block up into smaller binary sequences called ''list items''. Every ''list-item'' holds the same structure of content which is a sequence of three ''list-item-keys''.
 
The project uses a very fundamental memory model based on binary sequences. The entire memory can be divided into groups of smaller sequences which can themselves each be referred to by a locally unique binary sequence. For example, a 16 megabyte section of RAM can be divided into two million 64-bit sequences. ''List-space'' uses blocks of binary as its local memory resource and divides the block up into smaller binary sequences called ''list items''. Every ''list-item'' holds the same structure of content which is a sequence of three ''list-item-keys''.
  
= List item keys =
+
== List item keys ==
 
Since binary can be treated as numbers, each of the two million sequences in the example above can itself be referred to, or ''addressed'', by a unique binary sequence called a ''list-item-key''. In the case of two million items, the list-item-keys are 21 bit sequences. In other words, a 16MB ''list-space'' is divided into two million ''list-items'' each formed from three 21-bit ''list-item-keys''.
 
Since binary can be treated as numbers, each of the two million sequences in the example above can itself be referred to, or ''addressed'', by a unique binary sequence called a ''list-item-key''. In the case of two million items, the list-item-keys are 21 bit sequences. In other words, a 16MB ''list-space'' is divided into two million ''list-items'' each formed from three 21-bit ''list-item-keys''.
 
*The slight inefficiency of wasting one out of every 64 bits is done because of increased efficiency gained from working with sizes which are powers of two.
 
*The slight inefficiency of wasting one out of every 64 bits is done because of increased efficiency gained from working with sizes which are powers of two.
 
*Even an "empty" ''list-item'' containing only zero's is still considered to be composed of three ''list-item-keys'' all referring to the very first ''list-item'' in the ''list-space'' (the one that has a sequence of 21 zero's for its address).
 
*Even an "empty" ''list-item'' containing only zero's is still considered to be composed of three ''list-item-keys'' all referring to the very first ''list-item'' in the ''list-space'' (the one that has a sequence of 21 zero's for its address).
  
= Three keys =
+
== Three keys ==
 
There are a number of ways that ''list-items'' can be linked together to form lists and ''[[w:Binary Tree|binary-trees]]'' which are all constructed from this general "three-slot" data structure, such as [[stack]]s, [[queue]]s and [[axis|axes]]. ''List-space'' uses a generic [[loop]] linking system for handling whats in use and what's free, but the main functionality of ''list-space'' which is the foundations for [[Nodal Reduction]] is [[binary traversal details|binary traversal]].
 
There are a number of ways that ''list-items'' can be linked together to form lists and ''[[w:Binary Tree|binary-trees]]'' which are all constructed from this general "three-slot" data structure, such as [[stack]]s, [[queue]]s and [[axis|axes]]. ''List-space'' uses a generic [[loop]] linking system for handling whats in use and what's free, but the main functionality of ''list-space'' which is the foundations for [[Nodal Reduction]] is [[binary traversal details|binary traversal]].
  
 
Within each of the three keys common to all ''list-items'', the first and second are used for [[binary traversal details|binary traversal]] which allows ''list-item-keys'' to be used as [[association]]s (see [[key-as-reference]] for more details on this concept). The last key is context specific and represents a ''value'' at the end of an ''association'', but both the association-key and the association-value are ''list-item-keys'', references to other ''list-items''.
 
Within each of the three keys common to all ''list-items'', the first and second are used for [[binary traversal details|binary traversal]] which allows ''list-item-keys'' to be used as [[association]]s (see [[key-as-reference]] for more details on this concept). The last key is context specific and represents a ''value'' at the end of an ''association'', but both the association-key and the association-value are ''list-item-keys'', references to other ''list-items''.
  
= List-space methods =
+
== List-space methods ==
 
''List-space'' is an environment which offers a generic set of methods which can manipulate a space of ''list-items'', each addressable by a binary ''list-item-key''. Each ''list-item'' is composed of three ''list-item-keys''. This simple model is rich enough to support many kinds of higher data structures such as stacks, queues, threads, loops and trees.
 
''List-space'' is an environment which offers a generic set of methods which can manipulate a space of ''list-items'', each addressable by a binary ''list-item-key''. Each ''list-item'' is composed of three ''list-item-keys''. This simple model is rich enough to support many kinds of higher data structures such as stacks, queues, threads, loops and trees.
 
*listInsert()
 
*listInsert()
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*listGetKeys(subject)
 
*listGetKeys(subject)
  
= See also =
+
== See also ==
 
*[[list-space.c]] ''- current implementation''
 
*[[list-space.c]] ''- current implementation''
 +
[[Category:Nodal Concepts]]__NOTOC__

Revision as of 03:42, 30 August 2007

The Nodes are relatively high-level structures and at runtime within the peer-nodes they sit upon a more fundamental layer called list space in which the actual nodal change takes place in a peer.

List items

The project uses a very fundamental memory model based on binary sequences. The entire memory can be divided into groups of smaller sequences which can themselves each be referred to by a locally unique binary sequence. For example, a 16 megabyte section of RAM can be divided into two million 64-bit sequences. List-space uses blocks of binary as its local memory resource and divides the block up into smaller binary sequences called list items. Every list-item holds the same structure of content which is a sequence of three list-item-keys.

List item keys

Since binary can be treated as numbers, each of the two million sequences in the example above can itself be referred to, or addressed, by a unique binary sequence called a list-item-key. In the case of two million items, the list-item-keys are 21 bit sequences. In other words, a 16MB list-space is divided into two million list-items each formed from three 21-bit list-item-keys.

  • The slight inefficiency of wasting one out of every 64 bits is done because of increased efficiency gained from working with sizes which are powers of two.
  • Even an "empty" list-item containing only zero's is still considered to be composed of three list-item-keys all referring to the very first list-item in the list-space (the one that has a sequence of 21 zero's for its address).

Three keys

There are a number of ways that list-items can be linked together to form lists and binary-trees which are all constructed from this general "three-slot" data structure, such as stacks, queues and axes. List-space uses a generic loop linking system for handling whats in use and what's free, but the main functionality of list-space which is the foundations for Nodal Reduction is binary traversal.

Within each of the three keys common to all list-items, the first and second are used for binary traversal which allows list-item-keys to be used as associations (see key-as-reference for more details on this concept). The last key is context specific and represents a value at the end of an association, but both the association-key and the association-value are list-item-keys, references to other list-items.

List-space methods

List-space is an environment which offers a generic set of methods which can manipulate a space of list-items, each addressable by a binary list-item-key. Each list-item is composed of three list-item-keys. This simple model is rich enough to support many kinds of higher data structures such as stacks, queues, threads, loops and trees.

  • listInsert()
  • listRemove(subject)
  • listTraverse(subject, object)
  • listGetValue(subject)
  • listSetValue(subject, value)
  • listGetKeys(subject)

See also