AbstractClosed semirings are algebraic structures that provide a unified approach to a number of seemingly unrelated problems of computer science and operations research. For example, semirings can be used to describe the algebra related to regular expressions, graph-theoretical path problems, and linear equations. We present a new axiomatic formulation of closed semirings. We introduce the concept of eliminant, which simplifies the treatment of closed semirings considerably and yields very simple proofs of otherwise difficult theorems. We use eliminants to define matrix closure, formulate closure algorithms, and prove their correctness
We define rationally additive semirings that are a generalization of (ω)-complete and (ω)-continuous...
We show that the well-known algebra of matrices over a semiring can be used to reason conveniently a...
Traditional closure theory discusses the closure operations on orders with graph-theoretic methods, ...
Closed semirings are algebraic structures that provide a unified approach to a number of seemingly u...
AbstractClosed semirings are algebraic structures that provide a unified approach to a number of see...
*-semirings are algebraic structures that provide a unified approach to several problem classes in c...
Closed semi-rings and the closure of matrices oven closed semirings are defined and studied. Closed...
AbstractClosed semi-rings and the closure of matrices over closed semi-rings are defined and studied...
AbstractThis paper surveys several alternative data structures and algorithms for multiplying sparse...
AbstractGiven a continuous semiring A and a collection H of semiring morphisms mapping the elements ...
with a broad background. Consider the problem to solve the algebraic path problem can be concluded t...
In this thesis, we study a semiring structure with a product based on theresolution rule of logic pr...
Five algebraic notions of termination are formalised, analysed and compared: well-foundedness or Noe...
We define a block based matrix representation in Agda and lift various algebraic structures (semi-ne...
We provide the operations of matrix addition, multiplication, trans-position, and matrix comparisons...
We define rationally additive semirings that are a generalization of (ω)-complete and (ω)-continuous...
We show that the well-known algebra of matrices over a semiring can be used to reason conveniently a...
Traditional closure theory discusses the closure operations on orders with graph-theoretic methods, ...
Closed semirings are algebraic structures that provide a unified approach to a number of seemingly u...
AbstractClosed semirings are algebraic structures that provide a unified approach to a number of see...
*-semirings are algebraic structures that provide a unified approach to several problem classes in c...
Closed semi-rings and the closure of matrices oven closed semirings are defined and studied. Closed...
AbstractClosed semi-rings and the closure of matrices over closed semi-rings are defined and studied...
AbstractThis paper surveys several alternative data structures and algorithms for multiplying sparse...
AbstractGiven a continuous semiring A and a collection H of semiring morphisms mapping the elements ...
with a broad background. Consider the problem to solve the algebraic path problem can be concluded t...
In this thesis, we study a semiring structure with a product based on theresolution rule of logic pr...
Five algebraic notions of termination are formalised, analysed and compared: well-foundedness or Noe...
We define a block based matrix representation in Agda and lift various algebraic structures (semi-ne...
We provide the operations of matrix addition, multiplication, trans-position, and matrix comparisons...
We define rationally additive semirings that are a generalization of (ω)-complete and (ω)-continuous...
We show that the well-known algebra of matrices over a semiring can be used to reason conveniently a...
Traditional closure theory discusses the closure operations on orders with graph-theoretic methods, ...