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چکیده
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The minimal length uncertainty is defined by, �x � (1) ¯h �p + α � �p ¯h , where √ α� is Planck length. Division both side of relation (1) to light velocity c we obtain a deformed time-energy uncertainty as, �t � (2) ¯h �E +t ��E ¯h , where √ t � is the Planck time. We use the natural units α � , c,¯h = 1. Therefore the uncertainty in the time is, �t � (3) 1 �E +t � �E. Inverting Eq. (3) one obtains, t (4) � �E2 −τ�E +1 = 0, where τ is substituted for �t. Solving (4) for minimum energy gives, �Emin ≈ (5) τ 2t � � 1 − � 1− 4t � τ 2 � . Comparing Eq. (5) with Eqs. (5), (10) of Ref. [1],
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