## Found 11 Documents (Results 1–11)

100
MathJax

### Hyper-pseudoformulas and $$M$$-solid ordered pseudovarieties. (English)Zbl 1247.08002

MSC:  08B15 06A15 06F99
Full Text:

### Characterization of sets of discrete functions by algebraic identities. (English)Zbl 1134.08003

MSC:  08A40 06A15 03C05
Full Text:

### Pseudoidentities and hyper-pseudoidentities. (English)Zbl 1082.08004

Nam, Ki-Bong (ed.) et al., Advances in algebra towards millennium problems. Proceedings of the 2004 international IMCC conference on related subjects to Clay problems, Chonbuk National University, Jeonju, Republic of Korea, August 4–6, 2004. Delhi: SAS International Publications (ISBN 81-88296-00-7/hbk). 163-180 (2004).
MSC:  08A62 06A15 08C99

### Complexity of terms and the Galois connection Id-Mod. (English)Zbl 1068.08004

Denecke, K. (ed.) et al., Galois connections and applications. Dordrecht: Kluwer Academic Publishers (ISBN 1-4020-1897-5/hbk). Mathematics and its Applications (Dordrecht) 565, 371-388 (2004).
MSC:  08B05 08B15 06A15

### Galois connections and complete sublattices. (English)Zbl 1066.06003

Denecke, K. (ed.) et al., Galois connections and applications. Dordrecht: Kluwer Academic Publishers (ISBN 1-4020-1897-5/hbk). Mathematics and its Applications (Dordrecht) 565, 211-229 (2004).
MSC:  06A15 06B23

### Intervals and complete congruences defined by $$M$$-solid varieties. (English)Zbl 1067.08006

Proceedings of the international conference on algebra and its applications (ICAA 2002), Chulalongkorn University, Bangkok, Thailand, March 18–20, 2002. Bangkog: Chulalongkorn University, Department of Mathematics (ISBN 970-13-2182-1). 121-132 (2002).
Full Text:

### M-solid quasivarieties. (English)Zbl 1052.08004

MSC:  08C15 08B15 06A15

### Universal algebra and applications in theoretical computer science. (English)Zbl 0993.08001

Boca Raton, FL: Chapman & Hall/CRC. xii, 383 p. (2002).

Full Text:

### Clones closed with respect to closure operators. (English)Zbl 0944.08001

MSC:  08A40 06A15 06B23

### A new method to study subvariety lattices of semigroup varieties. (English)Zbl 0927.20039

MSC:  20M07 08B15 06A15

all top 5

all top 3