Summary.—In order that any systems of popular voting shall be permanently successful it is necessary that the ballot shall be simple, intelligible, and secret. It must not be so long as to bewilder the voter of average intelligence, and it ought to give the voter a reasonable chance to “split” his ballot without running a serious risk of spoiling it. A short ballot is a far more effective instrument of democracy than a long ballot. Another essential is that the polling place shall be adequately safeguarded against fraudulent practices of any sort and that the counting of votes shall be conducted with absolute honesty. Any corrupt practice in connection with elections is a blow at the very heart of democracy. We hear a good deal, from time to time, about unfairness, fraud, and corruption at elections in the United States, particularly at elections in the larger cities. While these things occur now and then they are much less frequent than they used to be. American elections, taking them as a whole, are conducted with as much fairness and honesty as the elections which are held in any other country. Rival parties and candidates try hard to win; they seize every opportunity to gain political advantages over their opponents, and in so doing often travel very close to the line which separates right from wrong; but on the whole they try to keep within the letter of the election laws. Transgressions of the law may bring some temporary success but in the long run they do not pay, and the politicians know it.
General References
F. A. Cleveland, Organized Democracy, pp. 130-191;
P. O. Ray, Political Parties and Practical Politics, pp. 109-164; 298-321;
W. B. Munro, The Government of American Cities, pp. 102-152;
C. L. Jones, Readings on Parties and Elections, pp. 212-250;
A. N. Holcombe, State Government in the United States, pp. 143-164;
K. H. Porter, A History of Suffrage in the United States, pp. 20-46 and passim;
W. W. Willoughby and Lindsay Rogers, Introduction to the Problem of Government, pp. 107-126 (Popular Government).
Group Problems