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Perfection Nurseries, Incorporated, Foley, Alabama : we grow the best -o- we sell the best : our stock is sure to please you : 1937-1938

, 1937
Henry G. Gilbert Nursery and Seed Trade Catalog Collection., Perfection Nurseries., Dreitzler, M. S.,   +2 more
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Perfection Perfected [PDF]

Novum Testamentum, 2015
Hebrews evinces the linked exegetical aporiae of, on the one hand, tension between the asserted perfection of the believer and exhortations to further perfection and, on the other, a similar tension between Christ's exalted, preexistent nature and claims about his need for further perfection during his earthly life.
Timothy Luckritz Marquis
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Maimonides on Perfecting Perfection

Harvard Theological Review, 2017
This article addresses two critical questions concerning Maimonides's views on human perfection at the end of hisGuide of the Perplexed. The first is: For those who have reached the highest category of perfection—intellectual perfection, apprehension of the divine, the divine science—what prescription does Maimonides offer for perfecting that ...
Roslyn Weiss
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Synthesis and perfection evaluation of NaA zeolite membrane

Separation and Purification Technology, 2001
The synthesis of NaA zeolite membrane on a porous alpha -Al2O3 support from clear solution and the evaluation of the perfection of the as-synthesized membrane by gas permeation were investigated.
Xiaochun Xu, Weishen Yang, Liwu Lin
exaly   +1 more source

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Perfect and Deficient Perfect Numbers

The American Mathematical Monthly, 2019
For n a positive integer, let σ(n) denote the sum of the divisors of n. The number n is said to be deficient perfect if σ(n)/n=(2x−1)/x for some x∈N .
Rachfal, Emily, Holdener, Judy
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The quest for the perfect perfect-maze

2015 Computer Games: AI, Animation, Mobile, Multimedia, Educational and Serious Games (CGAMES), 2015
In this paper, the quest for the perfect perfect-maze is performed over the search space of perfect mazes using an approach of search-based procedural content generation. Perfect maze construction is rather random with little to no control of the final product.
Paul Hyunjin Kim, Roger Crawfis
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Perfect Digraphs

Journal of Graph Theory, 2014
AbstractThe clique number of a digraph D is the size of the largest bidirectionally complete subdigraph of D. D is perfect if, for any induced subdigraph H of D, the dichromatic number defined by Neumann‐Lara (The dichromatic number of a digraph, J. Combin. Theory Ser. B 33 (1982), 265–270) equals the clique number .
Stephan Dominique Andres, Winfried Hochstättler   +1 more
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Perfect and locally perfect colorings

Journal of Graph Theory, 1995
AbstractWe present a new algorithm for coloring perfect graphs and use it to color the parity orderable graphs, a class which strictly contains parity graphs. Also, we modify this algorithm to obtain an O(m2 + n) locally perfect coloring algorithm for parity graphs. © 1995 John Wiley & Sons, Inc.
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Cycle-perfect graphs are perfect

Journal of Graph Theory, 1996
Given any graph \(G\), the cycle graph \(C(G)\) of \(G\) is defined by letting the vertices of \(C(G)\) be the induced cycles of \(G\); two induced cycles of \(G\) are adjacent in \(C(G)\) if they have in \(G\) at least one edge in common. \(G\) is called cycle-perfect if \(G\) and \(C(G)\) have no chordless cycles of odd length at least five.
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