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'''1.1 Basic Mathematics'''
  
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'''1.1.1 Mathematical notation'''
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• '''≈''' : approximately equal
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• '''~''' : CST ·
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'''Supremum and infimum vs. maximum and minimum'''
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The concept of supremum, or least upper bound, is as follows: Let S={a[n]} , the sequence with terms a[0],a[1],\cdots over all the nonnegative integers. S has a supremum, called \sup S , if for every n , a[n]\leq\sup S (i.e. no a[n] exceeds \sup S ), and furthermore, \sup S is the least value with this property; that is, if a[n]\leq b for all n, then \sup S\leq b for all such b . This is why the supremum is also called the least upper bound, for a bound is a number which a function, sequence, or set, never exceeds. Similarly, one can define the infimum \inf S , or greatest lower bound.

Revision as of 11:09, 16 November 2010

1.1 Basic Mathematics

1.1.1 Mathematical notation

 : approximately equal

~ : CST ·

Supremum and infimum vs. maximum and minimum

The concept of supremum, or least upper bound, is as follows: Let S={a[n]} , the sequence with terms a[0],a[1],\cdots over all the nonnegative integers. S has a supremum, called \sup S , if for every n , a[n]\leq\sup S (i.e. no a[n] exceeds \sup S ), and furthermore, \sup S is the least value with this property; that is, if a[n]\leq b for all n, then \sup S\leq b for all such b . This is why the supremum is also called the least upper bound, for a bound is a number which a function, sequence, or set, never exceeds. Similarly, one can define the infimum \inf S , or greatest lower bound.

Alumni Liaison

Ph.D. on Applied Mathematics in Aug 2007. Involved on applications of image super-resolution to electron microscopy

Francisco Blanco-Silva