Loops with squares in two nuclei
Abstract
Although little can be gleaned about a loop with the property that its squares are, say, left nuclear (xx· yz = (xx· y)z), if its squares are also, say, middle nuclear ((x· yy)z = x(yy· z)), then the loop exhibits more structure than one might initially guess. Loops with squares in (at least) two nuclei include many well known classes of loops, such as C loops and extra loops, and not so well known classes such left C loops. In any loop with, say, left and middle nuclear squares, the intersection of the left and middle nuclei is a normal subloop; hence such a loop is simple if and only if it is a group or a simple unipotent loop. Loops in which squaring is a centralizing endomorphism have even more structure; they are power-associative, and a torsion loop in that class is a direct product of a loop of 2-elements and a loop of elements of odd order.
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