Journal of Formalized Mathematics
Volume 4, 1992
University of Bialystok
Copyright (c) 1992 Association of Mizar Users

Sets and Functions of Trees and Joining Operations of Trees

Grzegorz Bancerek
Polish Academy of Sciences, Institute of Mathematics, Warsaw

Summary.

In the article we deal with sets of trees and functions yielding trees. So, we introduce the sets of all trees, all finite trees and of all trees decorated by elements from some set. Next, the functions and the finite sequences yielding (finite, decorated) trees are introduced. There are shown some convenient but technical lemmas and clusters concerning with those concepts. In the fourth section we deal with trees decorated by Cartesian product and we introduce the concept of a tree called a substitution of structure of some finite tree. Finally, we introduce the operations of joining trees, i.e. for the finite sequence of trees we define the tree which is made by joining the trees from the sequence by common root. For one and two trees there are introduced the same operations.

MML Identifier: TREES_3

The terminology and notation used in this paper have been introduced in the following articles                   

Contents (PDF format)

1. Finite sets
2. Sets of trees
3. Functions yielding trees
4. Trees decorated by Cartesian product and structure of substitution
5. Joining of trees

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