Four square latches on to JIT

A passage in Euler's notebook 132 (written between 1740 and 1744) concerning the foursquares theorem is interpreted in a new way. The proof of the four-squares theorem is based on three lemmas. Euler proved two of them from which he deduced the theorem on the representation as a sum of four squares

We show that almost every natural number M is the sum of four squares with all their prime factors smaller than exp(20(log M log log M) 1Â2 ).

For a subgroup T of a group G(•), let L • (T ) and R • (T ) denote the sets of all left and right cosets, respectively. This paper is concerned with finite groups G(•) and G( \* ), where the places in which the Cayley tables of the two groups differ is determined by subgroups so that α 0 ⊆ α and β