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Reply to comment by celebratedrecluse in by !deleted26641

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RanDomino wrote

Early CrimethInc.: "Being homeless is revolutionary"

Later CrimethInc.: "Composite Positivity for Monoids

B. Traven

ABSTRACT

Let w be an injective curve equipped with an L-dependent group. It is well known that Lobachevsky’s conjecture is true in the context of planes. We show that is bounded by n′′. Is it possible to study freely non-elliptic categories? We wish to extend the results of [29] to matrices.

1 INTRODUCTION

It has long been known that every polytope is Huygens [37]. Is it possible to construct partially positive, bounded, natural fields? The work in [27, 27, 22] did not consider the stable case. A central problem in fuzzy topology is the extension of minimal categories. It is not yet known whether |O|=D, although [7] does address the issue of separability. In this context, the results of [27] are highly relevant. This reduces the results of [37] to a recent result of Davis [37]. Here, regularity is clearly a concern. In this context, the results of [27] are highly relevant. In [34, 10], it is shown that there exists a pseudo-freely invariant and connected integrable element. Therefore a useful survey of the subject can be found in [35]. In [19], the main result was the construction of stochastically pseudo-normal planes. E. Selberg’s construction of continuous elements was a milestone in arithmetic PDE. It was Turing who first asked whether continuously Monge, naturally pseudo-Perelman groups can be examined. Therefore recently, there has been much interest in the

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celebratedrecluse wrote

eh, the early stuff is kinda cringe and for bored suburban middle class kids. but there's nothing wrong with writing to your audience

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[deleted] wrote (edited )

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celebratedrecluse wrote

i agree actually, I was thinking of their newer books rather than the other content. for example, contradictionary was good

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[deleted] wrote

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celebratedrecluse wrote

there are so many things to read in this world, but perhaps at some point you will check it out and hopefully enjoy it :)

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