Comments on JH's disagreement with the nebular hypothesis of Auguste Comte, and points out to JM that JH disagrees with some of JM's writings on physical science as well.
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The Sir John Herschel Collection
The preparation of the print Calendar of the Correspondence of Sir John Herschel (Michael J. Crowe ed., David R. Dyck and James J. Kevin assoc. eds, Cambridge, England: Cambridge Univ. Press, 1998, viii + 828 pp) which was funded by the National Science Foundation, took ten years. It was accomplished by a team of seventeen professors, visiting scholars, graduate students, advanced undergraduates, and staff working at the University of Notre Dame.
The first online version of Calendar was created in 2009 by Dr Marvin Bolt and Steven Lucy, working at the Webster Institute of the Adler Planetarium, and it is that data that has now been reformatted for incorporation into Ɛpsilon.
Further information about Herschel, his correspondence, and the editorial method is available online here: http://historydb.adlerplanetarium.org/herschel/?p=intro
No texts of Herschel’s letters are currently available through Ɛpsilon.
Comments on JH's disagreement with the nebular hypothesis of Auguste Comte, and points out to JM that JH disagrees with some of JM's writings on physical science as well.
Proceeds to show JM in detail that Comte's nebular hypothesis is arguing in a 'vicious circle' [see JH's 1845-7-10].
Is willing to have JM show Comte JH's letter of 1845-7-13, but not JH's 1845-7-16. The latter of these two was intended to show JM the nature of the argument from JH's perspective.
Sorry for the delay in response; JH has been ill for some time. JM has objected to P. S. Laplace's theory of probabilities; JH strongly supports Laplace.
Continues JH's defense of Laplace's writings on probabilities [see JH's 1845-12-22].
A note to accompany a working out in convenient form an example of Laplace's probability ideas. [Enclosure not found.]
Do as JM suggests. Further comments on JH's dispute with the theories of Auguste Comte.
Two problems verifying a theory of P. S. Laplace.