Two oriented knots (or links) can be summed by placing them side by side and joining them by straight bars so that orientation is preserved in the sum. The knot sum is also known as composition (Adams 1994) or connected sum (Rolfsen 1976, p. 40).
This operation is denoted #, so the knot sum of knots 
and 
is written
 |
The figure above illustrated the knot sum of two trefoil knots having the same handedness.
The knot sum is in general not a well-defined operation, but depends on the choice of balls where the connection is made and perhaps also on the choice of the attaching homeomorphism. The square knot and granny knot illustrate this ambiguity (Rolfsen 1976, pp. 40-41).
Schubert (1949) showed that every knot can be uniquely decomposed (up to the order in which the decomposition is performed) as a knot sum of a class of knots known as prime knots, which cannot themselves be further decomposed. Knots that are the sums of prime knots are known as composite knots.
The knot sum of any knot 
with the unknot is again 
(Adams 1994, p. 8). The knot sum of any number of knots
cannot be the unknot unless each knot in the sum is the
unknot (Schubert 1949; Steinhaus 1999, p. 265).
