*Javascript*to function properly

# Bibliography

On Logical Graphs

## Htabs

Type:

Manuscript

Title:

On Logical Graphs

Id:

MS [R] 482

Year:

1896-98 [c.]

Description:

**Robin Catalogue:**

A. MS., n.p., [c. 1896-98], pp. 1-30; plus 192 pp., partially ordered, but mainly a confusion of alternatives or rejects.

Includes partial drafts of several different papers (e.g., parts of an early draft of 3.468 ff.). Application of topology to logical graphs; examples and rules for interpretation; illative transformations.

Language:

English

Peirce, C. S. (1896-98 [c.]).

*On Logical Graphs*. MS [R] 482.The entry in BibTeX format.

author = "Charles S. Peirce",

title = "{On Logical Graphs. MS [R] 482}",

year = 1896-98 [c.],

abstract = "{Robin Catalogue: A. MS., n.p., [c. 1896-98], pp. 1-30; plus 192 pp., partially ordered, but mainly a confusion of alternatives or rejects. Includes partial drafts of several different papers (e.g., parts of an early draft of 3.468 ff.). Application of topology to logical graphs; examples and rules for interpretation; illative transformations. }",

language = "English",

note = "From the Commens Bibliography | \url{http://www.commens.org/bibliography/manuscript/peirce-charles-s-1896-98-c-logical-graphs-ms-r-482}"

}

title = "{On Logical Graphs. MS [R] 482}",

year = 1896-98 [c.],

abstract = "{Robin Catalogue: A. MS., n.p., [c. 1896-98], pp. 1-30; plus 192 pp., partially ordered, but mainly a confusion of alternatives or rejects. Includes partial drafts of several different papers (e.g., parts of an early draft of 3.468 ff.). Application of topology to logical graphs; examples and rules for interpretation; illative transformations. }",

language = "English",

note = "From the Commens Bibliography | \url{http://www.commens.org/bibliography/manuscript/peirce-charles-s-1896-98-c-logical-graphs-ms-r-482}"

}

Commens Dictionary entries from ‘On Logical Graphs’

1896-98 [c.] | MS [R] 482:18
Conduct is action shaped toward some result. |

1896-98 [c.] | MS [R] 482:13
Characters of second intention are characters which are brought to our knowledge, not by observation of their subjects, but by observation of logical forms. Relatives of second intention are of high importance in logic, as might be anticipated. Especially so are those which express the numbers of collections. All such arithmetical relatives are expressible in terms of three fundamental arithmetical relatives, a monad, a dyad, and a triad. Without these the most elementary requisites of logic cannot be fulfilled. |