George Boole (boole)
Mentioned on the following portal pages
Stanford Encyclopedia of PhilosophyContributions to Philosophie.ch
No contributions yet
Bibliography
Boole, George. 1841. “On Certain Theorems in the Calculus of Variations.” Cambridge Mathematical Journal 2: 97–102.
Boole, George. 1842a. “Exposition of a General Theory of Linear Transformations, Part I.” Cambridge Mathematical Journal 3: 1–20.
Boole, George. 1842b. “Exposition of a General Theory of Linear Transformations, Part II.” Cambridge Mathematical Journal 3: 106–119.
Boole, George. 1844. “On a general method of analysis.” Philosophical Transactions of the Royal Society of London 134: 225–282.
Boole, George. 1845. “Notes on Linear Transformations.” Cambridge Mathematical Journal 4: 161–171.
Boole, George. 1847. The Mathematical Analysis of Logic. Being an Essay Towards a Calculus of Deductive Reasoning. Cambridge, Massachusetts: Macmillan, Barclay, & Macmillan. Reprinted in Ewald (1996, 451–509) and as Boole (1998).
Boole, George. 1848. “The calculus of logic.” The Cambridge and Dublin mathematical journal 3: 183–198.
Boole, George. 1854. An investigation of the laws of thought, on which are founded the mathematical theories of logic and probabilities. London: Walton; Maberly. Reprinted by Thoemmes Press (Bristol) 1998.
Boole, George. 1859. A treatise on differential equations. London: MacMillan Publishing Co.
Boole, George. 1860. A treatise on the calculus of finite differences. London: MacMillan Publishing Co.
Boole, George. 1948. Collected Logical Works. Oxford: Basil Blackwell Publishers.
Boole, George. 1992. “Les lois de la pensée.” in Logique et fondements des mathématiques, Anthologie (1850–1914), edited by François Rivenc and Philippe de Rouilhan, pp. 71–92. Paris: Payot. Traduction partielle de Boole (1854).
Boole, George. 1998. The Mathematical Analysis of Logic. Being an Essay Towards a Calculus of Deductive Reasoning. Bristol: Thoemmes Press. With a new introduction by John Slater.
Further References
Ewald, William Bragg, ed. 1996. From Kant to Hilbert: A Source Book in the Foundations of Mathematics. Oxford: Oxford University Press.