In Hsuchow they found that the railway to the south had been cut and having no desire to be caught again, they booked air passage immediately to Shanghai. While in Hsuchow they learned from persons who had fled from Lin-i (Ichowfu) in South Shantung, that Lin-i had been taken by the Communists without a fight after the Garrison Commander had required the people to tear down their homes and places of business adjacent to the city walls in order that they might not provide the Communists with cover during an assault. Despite these precautions the city was evacuated and the Communists were able to move in unopposed. The whereabouts of the garrison of Lin-i, which amounted to at least 10,000 troops, is unknown. They also learned that the only rail traffic out of Hsuchow is to Linch’eng, 25 miles to the north.

Two upper incisors vertically implanted with I 1 slightly larger than I 2 (judging from the remaining roots), strong vertical upper and lower canine with rounded crown sections, reduced and single-rooted P 2, P 3 as large as P 4, simple with their crown obliquely orientated and high protoconid, M 1 with low paraconid, metaconid widely separated from protoconid, and buccodistally projecting hypoconulid.

The nematodesmata extend posteriorly to form the rhabdos or litostome cytopharyngeal apparatus. Dileptus species may have two rings of nematodesmata, the inner one of which is not associated with kinetosomes (Grain & Golińska, 1969).

What constructive mathematicians know is that there are mathematical universes in which sets are like topological spaces and properties are like open sets. In fact, these universes are well-known to classical mathematicians (they are called toposes), but they look at them from “the outside”. When we consider what mathematicians who live in such a universe see, we discover many fascinating kinds of mathematics, which tend to be constructive. The universe of classical mathematics is special because in it all sets are like discrete topological spaces. In fact, one way of understanding LEM is “all spaces/sets are discrete”. Is this really such a smart thing to assume? If for no other reason, LEM should be abandoned because it is quite customary to consider “continuous” and “discrete” domains in applications in computer science and physics. So what gives mathematicians the idea that all domains are discrete?