Aspects of the problem of universals

@inproceedings{Brownstein1973AspectsOT,
  title={Aspects of the problem of universals},
  author={Donald Brownstein},
  year={1973}
}
88 p. 23 cm Conference held Oct. 8-10 Includes bibliographical references University of Kansas author 

Recent Books

[1] Gale, G. and Walter, E. "Kordig and the Theory-Ladenness of Observation." Philosophy of Science 40 (1973): 415-432. [2] Hanson, N. R. Patterns of Discovery. Cambridge: Cambridge University Press,

Divergent, Violating the Law of Non-Contradiction

Propositional logics and Three-Valued Logics (3VL) are useful tools for analyzing the Riemann Hypothesis (RH). Riemann’s "expression" of ζ(s) claims to be convergent throughout half-plane Re(s) ≤ 1

Analytic Continuation of $\zeta(s)$ Violates the Law of Non-Contradiction (LNC)

The Dirichlet series of $\zeta(s)$ was long ago proven to be divergent throughout half-plane $\text{Re}(s)\le1$. If also Riemann's proposition is true, that there exists an "expression" of $\zeta(s)$

Observational Invariance

In [1] George Gale and Edward Walter criticize two of my recent articles on the relation of observation to theory in science ([3], [4]; cf. also [5]). My reply here has three parts. In the first I

Quality Instances and the Structure of the Concrete Particular

In this paper, I examine a puzzle that emerges from what J. P. Moreland has called the traditional realist view of quality instances. Briefly put, the puzzle is to figure out how quality instances

"Ean hôsautôs tê psuchê epi pantas idês" (Platonis Parmenides, 132a 1 - 132b 2). Voir les idées avec son âme et le “Troisième homme” de Platon

The argument most scholars refer to as “Plato’s Third Man” has been much discussed and variously accounted for. Most of the time logical analysis gets the lion’s share and little attention is paid to

In Half-Plane $\text{Re}(s)\le1$, Riemann's $\zeta(s)$ is Convergent and the Dirichlet Series of $\zeta(s)$ is Divergent, Violating the Law of Non-Contradiction

Propositional logics and Three-Valued Logics (3VL) are useful tools for analyzing the Riemann Hypothesis (RH). Riemann’s "expression" of ζ(s) claims to be convergent throughout half-plane Re(s) ≤ 1

References

SHOWING 1-2 OF 2 REFERENCES

Realism, pp. 104-106; and see G. Bergmann, "Synthetic A Priori,'* in Logic and Reality (Madison

  • University of Wisconsin,
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On The Relations of Universals and Particulars," in Logic and Knowledge, R. C

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