Talk:Boolean algebra: Difference between revisions
Jump to navigation
Jump to search
imported>Peter Schmitt (→Relationship of Boolean algebra and formal logic: more than one topic) |
imported>Peter Schmitt |
||
Line 8: | Line 8: | ||
:::I have tried to clarify the connection to algebra in general and elementary algebra in particular, and have included a source for further exploration of this topic. [[User:John R. Brews|John R. Brews]] 14:49, 18 July 2011 (UTC) | :::I have tried to clarify the connection to algebra in general and elementary algebra in particular, and have included a source for further exploration of this topic. [[User:John R. Brews|John R. Brews]] 14:49, 18 July 2011 (UTC) | ||
:::: Boolean algebra and formal logic are not the same. Boolean logic is only a special type of formal or | :::: Boolean algebra and formal logic are not the same. Boolean logic is only a special type of formal or mathematical logic corresponding to classical proposition logic. In fact, I think that there should be a general introduction [[Boolean algebra]] (rather informal than technical) on its origin and its uses, and more specialized articles on [[Boolean lattice]] (or algebra (mathematics), [[Boolean logic]], and [[Boolean circuits]] (or Circuit algebra or similar). --[[User:Peter Schmitt|Peter Schmitt]] 22:43, 18 July 2011 (UTC) |
Latest revision as of 17:44, 18 July 2011
Relationship of Boolean algebra and formal logic
Arguably, there is no difference between Boolean algebra and formal logic. But, as far as I know, only mathematicians and computer scientists talk about Boolean algebra per se, and their approach (including the symbols and the typical way of working out the deductive systems) is different from the philosophers' approach. ...And I can't say much more than that. I did add one sentence to this effect, but clearly, a lot more needs to be said in the article somewhere, somehow. --Larry Sanger 01:11, 18 July 2011 (UTC)
- Larry: I imagine that Peter Schmitt can be more definitive on this subject. However, my guess is that (i) Boolean algebra is in fact not equivalent to formal logic, but is one of several frameworks, and (ii) high school algebra may have elements in common with Boolean algebra, but algebra in the abstract is a much bigger subject than either of these. John R. Brews 02:10, 18 July 2011 (UTC)
- Thanks for the reply. You're surely right, they aren't equivalent. Boolean algebra is definitely a branch of mathematics, using the tools of math to model (maybe that's the wrong word) the sorts of rules and inferences that are covered by formal logic. How to state this with the most accuracy and usefulness to the non-mathematician lay reader would be far beyond me... --Larry Sanger 02:20, 18 July 2011 (UTC)
- I have tried to clarify the connection to algebra in general and elementary algebra in particular, and have included a source for further exploration of this topic. John R. Brews 14:49, 18 July 2011 (UTC)
- Thanks for the reply. You're surely right, they aren't equivalent. Boolean algebra is definitely a branch of mathematics, using the tools of math to model (maybe that's the wrong word) the sorts of rules and inferences that are covered by formal logic. How to state this with the most accuracy and usefulness to the non-mathematician lay reader would be far beyond me... --Larry Sanger 02:20, 18 July 2011 (UTC)
- Boolean algebra and formal logic are not the same. Boolean logic is only a special type of formal or mathematical logic corresponding to classical proposition logic. In fact, I think that there should be a general introduction Boolean algebra (rather informal than technical) on its origin and its uses, and more specialized articles on Boolean lattice (or algebra (mathematics), Boolean logic, and Boolean circuits (or Circuit algebra or similar). --Peter Schmitt 22:43, 18 July 2011 (UTC)
Categories:
- Article with Definition
- Mathematics Category Check
- Engineering Category Check
- Philosophy Category Check
- Developing Articles
- Nonstub Articles
- Internal Articles
- Mathematics Developing Articles
- Mathematics Nonstub Articles
- Mathematics Internal Articles
- Engineering Developing Articles
- Engineering Nonstub Articles
- Engineering Internal Articles
- Philosophy Developing Articles
- Philosophy Nonstub Articles
- Philosophy Internal Articles
- Mathematics Underlinked Articles
- Underlinked Articles
- Engineering Underlinked Articles
- Philosophy Underlinked Articles