Add to ORKGMany of the commonly studied properties of a variety, such as permutability, and congruence distributivity and modularity, can be dened by a Maltsev condition. This paper concerns questions like: given a nite algebra A how hard is it to determine if V (A) is congruence distributive, and, if it is, nd Jonsson terms
this paper, however, since it is not known if a congruence variety properly above HV p must contain ...
We show that a variety V is congruence distributive if and only if there is some h such that the inc...
We show that a variety V is congruence distributive if and only if there is some h such that the inc...
Abstract. This paper studies the complexity of determining if a finite algebra generates a variety t...
For varieties, congruence modularity is equivalent to the tolerance intersection property, TIP in sh...
For varieties, congruence modularity is equivalent to the tolerance intersection property, TIP in sh...
For varieties, congruence modularity is equivalent to the tolerance intersection property, TIP in sh...
For varieties, congruence modularity is equivalent to the tolerance intersection property, TIP in sh...
ame congruence theory identifies six Maltsev conditions associated with locally finite varieties omi...
Abstract. For varieties, congruence modularity is equivalent to the tolerance intersection property,...
For an arbitrary lattice identity implying modularity (or at least congruence modularity) a Mal&apos...
Let A and B be idempotent varieties and suppose that the variety A∨B is congruence permutable. Then ...
We show that, under the assumption of congruence distributivity, a condition by S. Tschantz characte...
We show that a variety V is congruence distributive if and only if there is some h such that the inc...
We show that a variety V is congruence distributive if and only if there is some h such that the inc...
this paper, however, since it is not known if a congruence variety properly above HV p must contain ...
We show that a variety V is congruence distributive if and only if there is some h such that the inc...
We show that a variety V is congruence distributive if and only if there is some h such that the inc...
Abstract. This paper studies the complexity of determining if a finite algebra generates a variety t...
For varieties, congruence modularity is equivalent to the tolerance intersection property, TIP in sh...
For varieties, congruence modularity is equivalent to the tolerance intersection property, TIP in sh...
For varieties, congruence modularity is equivalent to the tolerance intersection property, TIP in sh...
For varieties, congruence modularity is equivalent to the tolerance intersection property, TIP in sh...
ame congruence theory identifies six Maltsev conditions associated with locally finite varieties omi...
Abstract. For varieties, congruence modularity is equivalent to the tolerance intersection property,...
For an arbitrary lattice identity implying modularity (or at least congruence modularity) a Mal&apos...
Let A and B be idempotent varieties and suppose that the variety A∨B is congruence permutable. Then ...
We show that, under the assumption of congruence distributivity, a condition by S. Tschantz characte...
We show that a variety V is congruence distributive if and only if there is some h such that the inc...
We show that a variety V is congruence distributive if and only if there is some h such that the inc...
this paper, however, since it is not known if a congruence variety properly above HV p must contain ...
We show that a variety V is congruence distributive if and only if there is some h such that the inc...
We show that a variety V is congruence distributive if and only if there is some h such that the inc...