While all divisor methods share the same general procedure, they differ in the choice of signpost sequence and therefore rounding rule. Note that for methods where the first signpost is zero, every party with at least one vote will receive a seat before any party receives a second seat; in practice, this typically means that every party must receive at least one seat, unless disqualified by some
electoral threshold.
Jefferson (D'Hondt) method Thomas Jefferson was the first to propose a divisor method, in 1792; it was later independently developed by Belgian political scientist
Victor d'Hondt in 1878. It assigns the representative to the list that would be most underrepresented at the end of the round. It remains the most-common method for
proportional representation to this day. Jefferson's method uses the sequence \operatorname{post}(k) = k+1, i.e. (1, 2, 3, ...), which means it will always round a party's apportionment down. Jefferson's apportionment never falls below the lower end of the
ideal frame, and it minimizes the worst-case overrepresentation in the legislature. However, it performs poorly when judged by most other metrics of proportionality. The rule typically gives large parties an excessive number of seats, with their seat share often exceeding their entitlement rounded up. This
pathology led to widespread mockery of Jefferson's method when it was learned Jefferson's method could "round"
New York's apportionment of 40.5 up to 42, with Senator
Mahlon Dickerson saying the extra seat must come from the "
ghosts of departed representatives".
Adams' method Adams' method was conceived of by
John Quincy Adams after noticing Jefferson's method allocated too few seats to smaller states. It can be described as the inverse of Jefferson's method; it awards a seat to the party that has the most votes per seat
before the new seat is added. The divisor function is , which is equivalent to always rounding up. Adams' apportionment never exceeds the upper end of the
ideal frame, and minimizes the worst-case underrepresentation. However, like Jefferson's method, Adams' method performs poorly according to most metrics of proportionality. It also often violates the
lower seat quota. Adams' method was suggested as part of the Cambridge compromise for apportionment of
European parliament seats to member states, with the aim of satisfying
degressive proportionality.
Webster (Sainte-Laguë) method The Sainte-Laguë or Webster method, first described in 1832 by American statesman and senator
Daniel Webster and later independently in 1910 by the French mathematician
André Sainte-Lague, uses the fencepost sequence (i.e. 0.5, 1.5, 2.5); this corresponds to the standard
rounding rule. Equivalently, the odd integers (1, 3, 5...) can be used to calculate the averages instead. The Webster method produces more proportional apportionments than Jefferson's by almost every metric of misrepresentation. As such, it is typically preferred to D'Hondt by political scientists and mathematicians, at least in situations where manipulation is difficult or unlikely (as in large parliaments). It is also notable for minimizing
seat bias even when dealing with parties that win very small numbers of seats. The Webster method can theoretically violate the
ideal frame, although this is extremely rare for even moderately-large parliaments; it has never been observed to violate quota in any
United States congressional apportionment. In small districts with no
threshold, parties can
manipulate Webster by splitting into many lists, each of which wins a full seat with less than a
Hare quota's worth of votes. This is often addressed by modifying the first divisor to be slightly larger (often a value of 0.7 or 1), which creates an
implicit threshold.
Huntington–Hill method In the
Huntington–Hill method, the signpost sequence is , the
geometric mean of the neighboring numbers. Conceptually, this method rounds to the integer that has the smallest
relative (percent) difference. For example, the difference between 2.47 and 3 is about 19%, while the difference from 2 is about 21%, so 2.47 is rounded up. This method is used for allotting seats in the US House of Representatives among the states. The Huntington–Hill method tends to produce very similar results to the Webster method, except that it guarantees every state or party at least one seat (see ). When first used to assign seats in the
House, the two methods produced identical results; in their second use, they differed only in assigning a single seat to
Michigan or
Arkansas. == Comparison of properties ==