The paper studies the weighted weak type inequalities for the Hardy operator as an operator from weighted to weighted weak in the case . It considers two different versions of the Hardy operator and characterizes their weighted weak type inequalities when . It proves that for the classical Hardy operator, the weak type inequality is generally weaker when . The best constant in the inequality is also estimated.
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to weighted weak 
in the case 
. It considers two different versions of the Hardy operator and characterizes their weighted weak type inequalities when 
. The best constant in the inequality is also estimated.
